paper. Research into these interactive disciplines is needed to develop ..... computer hard- ware, software, and programming techniques. Table. I shows ..... system componentsbe adequately modeled, in contrast to past practice in which only ...... n6 c , n6 a. , n6p_. ,0_ EOOR. QUALi't_ where. X i xi. "_". ;. Yi. Mi. :i. = T-. Y ! t£.
N88-16642 HELICOPTER
MATHEMATICAL FOR
Robert
T.
NASA
N.
MODELS
HANDLING
Chen,
J.
Ames
Research
U.S.
Army
Ames
Research
CONTROL
QUALITIES
Victor
B.
LAW
DEVELOPMENT
RESEARCH
Lebacqz,
Center, Mark
NASA
AND
and
Moffett
Edwin
Field,
W.
CA
hiken
94035
Tischler
Aeroflightdynamics Center,
Directorate
Moffett
Field,
CA
94035
SUMMARY
Progress
made
in joint
modeling,
design
parameter
identification
disciplines
is needed investigatins
permit
efficient for
acute
rotorcraft
for
and
generated expand
modeling
their
to modern
rotorcraft
flight
investigate
the
systems
combat
and paper via
for
time-domain describes contracts
range
design
along
laws
details
of
industry,
the
design
analysis
both
grants
the
Also with
that
rotorcraft
inhouse
of
used
digital
and
are
and
high-gain
in
flight
the
techniques, and
design
conducted
flight
applications
research
universities,
maneuvers
is a study
high-gain,
nonlinear models
frequency-domaln
are
reviewed
identification
for
to
classical
methodology
Parameter
the
linear
for
associated
rotorcraft.
generic
high-g
dynamic
rotorcraft
In
to
from
order in
addition,
to
flying
particularly
directions:
flight
ranginF
is
high
1-g
and
rotorcraft
research
from
control
developed
to
general
is reviewed.
approaches, results
two
flying
simulators,
research
The
interactive
conduct
of
complexity,
rotorcraft
these
to
in-flight
the
rotorcraft.
validity method
time-domain
control
for
flight-dynamics and
into
evaluation
requirements.
specific
of of
need
laws,
necessary
and
test
mathematical
utilization
A variety
approaches
flight The
their
rotorcraft
Research
tools
ground-based
mission
for
their
frequency
the
is pursued
paper.
analytical
compliance.
models
extend
systems.
both
of
concerning flight-control
in this
the
performing
demanding
nonlinear that
control
of
because
and
flight-dynamics models
using
specification
characteristics,
research
rotorcraft
is reviewed
means
qualities
for
to develop
qualities an
NASA/Army
methodologies
control
both are
other
frequency-
reviewed.
related
international
of to
The
efforts
collaborative
programs.
INTRODUCTION
This opment
of
qualities Research and
paper the
helicopter
research Center
parameter
provide
summarizes
using
(ARC}.
the math
models
both
the
The
identification
a capability
to
results
paper
of and
the
joint
also
the
and
discusses using
fidelity
837
NASA/Army
flight
ground-based
techniques
improve
the
the
laws
in-flight
the
flight of
control
efforts
test
data. models
of
at
state
These and
devel-
handling-
simulators
development
math
for
in the
Ames estimation
techniques
permit
an
efficient for
means
of
Efforts real-time
Army's
new
simpler laws
to
under
tion,
simulation
research
develop
a
evaluation
primarily
by
in
models
enhance
the
models
of
helicopter
flying
expressly
for of
UH-IH
developed
need
piloted
to
conduct
qualities
area.
military or
for
the
the
the
ground-based for
also
investigation
conduct
to
aerial
perform
NOE
combat.
In
research
use
1981,
on
the
computers.
these
Ames
analytical
ground
speed
To
stay
in addition
duction
of the
expanded number and
flight-dynamics
simulators
and
which
capacity,
within
level
of
of degrees fuel
at
typical
a reasonable
math that
of
models
time
the
were
had
Xerox
computational
freedom
the
fits
only
Sigma
cycle
were
also
used
as
and
To
provide
design
analyses
from to
or
for the
of
high-g
addi-
programs
using
mainly
a moderate
level
class
time,
of
the
digital
frequency
high-order
by
the
including models
ence of rotor bandwidth.
and
on
airframe
frequency
were other
used
an
of
control
in
the
of
the
investigation
and
models.
display
were
in
the
the
the
engine
level
control
of
system. for
the
used
to
exam-
operational of
turn.
This
coupling
turns
for
dynamics
888
new
that
flight
potential
of
the the
as and
of
linear
bene-
a new
models
were
procedure
was
simulates
analytical
characteristics
validity
analytical
model
single-rotor
extending
such
laws,
In particular,
a nonlinear
of
and
was
and
models
data
in
controls.
performance to
flight
intro-
{VMS)
for
with
simulation test
boundaries
effects
high-order
its
the
range
high-order
simulation
and
flight
moments
compatible
for
high-g
In addition
in the be
real-time
rotorcraft
the
to
the
models
and
near
of
With
included of freedom
Simulator
forces
a basis
from
direction
maneuvers
systems.
maneuvers,
expanded
the
the
Motion
flight-dynamics
Details
with
simulation
steep,
examine of
high-g
augmentation
helicopter
propulsion
linearization
uncoordinated,
significance
impact
nonlinear
permit
to systematically
the
validated
flight
nated
mis-
developed
dynamics.
Vertical
aerodynamic
expanded
characteristics
were
rigid-body
the
model.
for
integrating
developed
the the
also
of
generated
the to
full-flight-envelope
flight
They
were
simulation
systgem
helicopter
of
of of
in the
system
high-frequency,
envelopes.
6 DOF
dedicated
calculation
of
of
basic
machine
sophistication
control
aircraft/engine
the
the
7600
in the
sophistication
ine
to
a CDC
both
its
These
and
CH-47B
range of applicability of these simple models was somewhat limited. They at most the flapping-dynamics and the main rotor rotational-speed degrees
1982,
at
control
aircraft.
computational
(DOF),
the
directed
of
variable-stability
in-flight
for
airworthiness
were
helicopters
to and
support
and
Efforts
in
suitable
requirements
operations
VSTOLAND
to
model
use
conditions
the
flight-dynamics
qualities
terminal
capability
for
were
(NOE)
the
weather
the
handling
nap-of-the-Earth
math
helicopter
generic
helicopter
operations
night/adverse
Until for
to
the
of
civil
sions
test
motivated
doctrine for
display
two
1975
to determine
developing
the
in
simulation
standards
flight
compliance.
began
simulation
of
conducting
specification
a coordi-
procedure
was
in high-g
helciopters,
used
turns,
and
the
stability-and-controllinear the
rotor
model linear
and
flight
on helicopter
inflow
from
1-g
flight
model
was
also
dynamics.
investigation
of
to
These the
flight-control-system
influ-
Several
methods
have
been used
to design
handling-qualities investigations. were used in the design of control characteristics mission tasks. applied
helicopter
flight
control
laws
Early on, classical frequency-domaln laws to provide a variety of control
for
methods response
for experimental determination of their suitability for various Time-domain, linear quadratic regulator theory was subsequently
to the design
of a high
performance
stabliity-and-controi-augmentation
system for a hingeless rotor helicopter to be used for piloted evaiuatlon on a ground-based simulator. The linear quadratic regulator (LQR)-based, low-order compensation method developed at Stanford University was applied to the design of a hover hold system for the CH-47 research helicopter and was evaluated in flight on that aircraft. An optimal cooperatlve-control synthesis method developed originally for fixed-wing
aircraft
at Purdue
University
which
includes
an optimal
pilot
model
in the design procedure, was extended and applied to a CH-47 helicopter and was evaluated in a piloted ground-based simulation. In collaboration with industry, advanced control laws were developed for the Advanced Digital/Optical (ADOCS) demonstrator helicopter based on single-axis model-following cepts. A multivariable model-following control system was developed variable-stability
CH-47B
addition,
associated
problems
to enhance with
its in-flight
the design
and
simulation
Control System control confor the
capability.
implementation
In
of high-bandwidth
digital control systems for combat rotorcraft were investigated in order to reduce the cost and time involved in control system modifications or redesigns often required
during
the flight
It is essential analyses
test phase
of a development
that the mathematical
and syntheses
of flight
control
models
program.
for real time simulations
laws be evaluated
based
or for
on comparison
with
flight test data. To determine how well a simulation model represents the real rotorcraft, the trim characteristics and the response-time histories from flight tests must be compared with those predicted from the model. If the comparison between the test and the calculated data is clearly unacceptable, the correlation must
be improved.
This can be achieved
through
the use of parameter
identification
techniques. The development of parameter identification techniques suitable for rotorcraft application has also been an active area of research at ARC; these techniques have used both time- and frequency-domain approaches. In the following sections, the results of both the In-house research and the related efforts via contracts to industry, grants to universities, and international collaborative
programs
REAL-TIME
The development
are described.
FLIGHT
DYNAMICS
of rotorcraft
MATHEMATICAL
flight dynamics
MODELS
FOR ROTORCRAFT
math models
at ARC has been
prompted primarily by the need for real-time, piloted ground-based simulation. The complexity of a rotorcraft math model for real-time, pilOt-in-the-loop simulation depends
on the purpose
may be conveniently representing
for which the model
classified
the dynamics
using
is to be used.
the two major
of the rotorcraft
839
factors:
The math
model
(I) levels
complexity
of detail
and (2) levels of sophistication
in
in
calculating The
the
first
range
of
range
of
two
ware,
software,
and a
in
implies
simple
Models
lope.
such
However,
for
simulations The
dom.
These
the
rigid-body
interaction is
and
The generic
no
can
are
most
involving
math
model and
Efforts
began
that
at
the
use
freedom
that
time
Sigma
cycle
time
model
was
rotor
rotational
(2)
tail
and
(6)
The ally
(on
of
the
order
rotor, control
The I-3) (3)
main
of
overall
rotor and
It
The
model summed
the
be
of
of
of
the
therefore, for
control,
free-
those
the
it
simula-
inclusion
required. along
the
two
generic
general
directions:
speed within
frequency
range
only
of
fuselage, elements forces,
rigid
the
I.
simulation model
(5)
blades
capacity,
typical
of and
the
6 DOF
the
rigid-
model,
of
which are:
is (I)
engine-dynamics-and-rpm
moments
with using
in
from
rotor
figure one
forces
essentially
the
the
dynamics
elements
Ti
of
computational
applicability
basic
for
simulators
reasonable
of
the
denoted and
and a
model
ground-based
flapping
to
The
azimuth,
84O
the
flight-dynamic
on
stay
in addition
the
investi-
regard
However,
feedback
flight
than
mode;
studies.
the
degrees
with
enve-
stall, and be included in
frequency
mode
investigations
(4)
about
higher
dynamic
simplified
model
assumes
of
are
inflow
of
flight
edges
rotorcraft and
and
stall.
Models
included
in figure
velocities,
the
the
of
linear
inflow,
or
of
to
rpm,
term
and
investigations
regions
much
pursued
To
arrangement
empennage,
of
a
freedom,
is shown
systems.
transfer
integrated
limited.
degrees
flapping
compressibility
specific
computational
ms),
of
levels
rotorcraft.
computers. 40
The
high-gain
been
specific
moderate
of
hard-
simula-
dynamics.
flapping-regressing
also
simulation
only
computer
rotor
lag, of
the
of
to develop
digital
necessarily
(refs.
to achieve another.
had
class
dynamics.
"ARMCOP"
1975
pilot-in-the-loop
second
rotorcraft.
differing
simulation
may
has
for
pilot-in-the-loop
Xerox
body
in
the
The
the
for
exploratory
of
Generic
exploratory
of
reflect
of
rotor
is
dynamics
development models
time.
simulation
exploration
generally
modes
in flight
of
cycle
for
limited
flap,
important
rigid-body
degrees
systems. frequency
simulation,
envelope
angles
for
characteristics
modes
included
the
the effects of compressibility, Also, nonlinear effects must
dynamic
models
used
involving
rotor
The
rotor
of
models
and small
within
include
the
models these
as
be
nature
modes
other
math
in generic studies must be included.
modes.
the
terms
real-time
flight
consideration
dynamic
with
in a
requirements
such
investigations
investigations
lag
with
the
for
in
permissible
aerodynamics
rotor
generally
tion of
the
a generic
whenever
model
in the
applications,
simplifications of
maximum
the
simplications
envelope, then even other nonlinearities the
the
validity
rotorcraft
representing
qualities
gated.
of
theory
especially
the
techniques.
specific
strip
with
handling
of
of
computation
dictate
list
on
aerodynamics of
sets
programming
I shows
Depending
moments,
digital
domain
together
completeness
use
validity
For
the
factors
Table tions.
and
the
interest
determines
These
forces
determines
applicability.
frequency factor
rotorcraft
factor
main
called main
rotor,
governor, I are
axis
and linear
required
sytem
moments
to
radi-
aerodynamics
as discussed earlier. primary Lock
design
number,
rotor
and
without
a general
curve
are
fit
for
it uses
a
large
model
inputs
from
has the
provides
addition,
curve
for
mechanical
expanded low
to
have
the
include
altitude,
flight
on
rotor
inflow
loads
for
tables
solve
for
attack,
the
and
inflow
effects
momentum
fluctuation the
and
inflow
For
theory
for
an
experimentally
by
vortex
represented
by
in
the
the
functions
simulator has
low
of
low-speed,
in the
form
as
of
angle
of
of the
derived
including and
hub
of
state,
downwash angle
of
a set
downwash
by
speed,
a uniform-plus-
given
and
been
of
vortex-ring
induced
are
effect
induced
value
The
a linear-
proximity,
steady
derived
In
and
effects
data
ground
accepts
analysis
assuming
are
heli-
inputs.
model
The
tunnel
flight
as
7).
uses ±15 °,
augmentation,
piloted
The
and
of
The
which
cyclic
permit
results of
2,
stability
aerodynamic
wind
shedding.
sideslip.
control
5).
6,
model
range
turbulence,
obtained
The
replacing
with
were
the
was
descending by
to
The
aerodynamic sideslip
the
teetering
dynamics. limits
figure
and
4,
(refs.
functions
caused
fluctuations
of
by using
as
steep
model
(refs.
some
of
stability
coefficients.
modeled
phasing
this
downwash
then
in and
a
blade
stall
or
atmospheric
flight
coefficients
were
effect
thrust
model
the
airspeed.
aerodynamic from
main
or
to
of
descending
attack
shown
to be
between
and
the
offset,
plane
fuselage
of
as
model,
operations
representation
slope
augmentation
model
steeply
first-harmonic
system,
made
tip-path
attack
angle
mixing
and
low-altitude
to
been
engine-out
of
contain
hinge
is assumed
the
The
angle
control
dynamic
improvements of
control
control
rotor
attack.
large
engine/governor
ized six-degree-of-freedom included. Some
of at
facilitates
a simplified
investigations
fit
tail
lift-curve
a nominal
a generalized pilot,
a
explicitly
restraint,
including
with
angles
over
simplified
The
without
modeled
representation
copter
and
and
of motion
flapping-hinge
coupling.
pitch
aerodynamics
and
namely:
pitch-flap
cyclic
empennage
a detailed
The flapping equations
parameters,
a
thrust-
magnitude
attack
of
and
airspeed. This
model
has
ground-simulator (ref.
8),
been
for
helicopter
terminal
area
simulate
other
(refs.
research
within
improvements
air
extensively
the
representation
tasks
and
combat The
model
model
in
I0),
for
operations
also
and
been
civil
modified
qualities and
through
the
and
for
(refs.
to expand
analyses
qualities
industry,
sought
design
handling
handling
proximity
details
9,
has
for
been
in ground
dynamics
(refs.
agencies, have
in experimental
helicopter
helicopters
government
namic
of
11-13).
specific
of of
used
investigations
and
in
the
grants
in
14-_6)
frequency
for
NOE
configured control
the
flight
university. the of
in
and/or
to
Continuing
areas
research
range
operations
of
in
NOE
aerodymission
applicability
of
the
model. A simpler model
for
tion
at
to be low
ARC
opponent
(ref.
relatively
speeds,
lers.
the
generic
The
aerodynamic
and model
9).
model
(called
(red)
helicopter
Because
simple. in
forward
uses
Even
of so,
flight,
quasi-static
representation,
but
"TMAN") in
was the
computer
developed
first
capacity
is capable
of
and
is easy
to fly
it also
stability uses
841
the
use
as
the
simulation
was
required
helicopter-air-combat limits,
it
linear
for
the
realistic with
and
complete
a
model
simula-
maneuvers simple
control
set
drivatives
nonlinear
at
hover,
of
controlfor
kinematic
its and
of
gravitational terms. Whenconfigured for the simulation of the red helicopter, it had the following specific characteristics: an attitude commandsystem for pitch and roll at hover and for low-speed flight; and an altitude-rate commandand a yawrate commandsystem in the vertical and directional axes, respectively. In forward flight, the pitch and roll axes were transformed into angular rate commandsystems while the directional axis provided an automatic-turn-coordination feature. The model is very easy to modify to achieve other desired stability-and-control response characteristics, and as such it was used extensively as both the blue and red helicopters in the subsequent helicopter air-combat simulations (ref. 17). In addition, it is currently being used in helicopter human-factors laboratory experiments and simulations.
Specific
Rotorcraft
Math Models
Several flight-dynamics models for specific rotorcraft have also been developed in-house or jointly with the manufacturers. Someof these were developed by modifying the generic ARMCOP model described earlier. Other models such as UH-IH, CH-47B, UH-60, AH-64A, and XV-15 were developed separately. These math models are briefly described below. UH-60 UH-60
ARMCOP-
Black
The
Hawk
helicopter
tor
investigations
and
a Navy-sponsored
Hawk
(ref.
of
20).
the
fuselage
The
Army
copter
and
Flight
following the ated
on
large
of
system other
the
show The
the
tics tems.
of
two
(fig.
7a)
(fig.
7b),
collective
was
was
aircraft the
configured
since rate
its limit
rotor
these
helicopter. the
rpm
allowable
the
of
for
the
842
generic
in flight
$3
of
control model
have
the
helicopter
which well
the
two
and
have
as
in
helicopter reference
actuator in
the
21 s.
sysARMCOP
dynamics
impact
(ref.
In
evalu-
characteris-
governor
strong
Heli-
helicopter
dynamic
resident
and a
first
6 from
the
model-
V/STOLAND
flight
of
research.
was as
UH-IH
model
program
models
3 through
engine
represen-
under
system
their
limits
BO-IO5
the
the
dynamic
BO-105's and
using
use
systems
In
a
a multivariable
helicopter
a
UH-60
and
of
the
rotor,
data,
research
19)
Sea
incorporate
(DFVLR),
NASA/Army
(ref. SH-60
tail
for
simulate
specifics
dynamics
joint
simula-
actuator.
to
characteristics
actuating to
a
the
piloted
the
canted
test
Figures
simple-engine
to simulate
two
is the
a
of
helicopters
pitch-bias
(MOU),
control
$3
the
of
for
using
modified
Establishment
using
of
Army
of
UH-60
part
developed
configured
and
As
used
implemented
performance
and
generic
dynamics
the Ames
and
the
been
at
systems
model
effects
Understanding
dynamics One
control
In addition,
has
for
simulation
landings
wind-tunnel
Research
MFCS,
BO-IO5
and
the
been
significantly
ARMCOP-
of
simulator
DFVLR
ARMCOP
these
the
actuators.
typical
generic
(MFCS)
in flight
the
$3
Aerospace
system
a ground-based
and
governor
has
systems
the
extensive
Memorandum
developing
differences
control
and
was
allow
shipboard
included
upon
BO-I05
German
Controls
control
process
of
stabilator,
to
model
control
model
based engine
This
flight
fuselage
and
the
18).
modified
simulation
horizontal
the UH-60 in ARMCOP.
was
modifications
ARMCOP
UH-IH/VSTOLAND U.S.
(ref.
advanced
aerodynamics,
tation of available
model
piloted
variable-incidence addition,
ARMCOP
21).
on
the
AI09 being
ARMCOP-
Under
configured
Efforts from
have
the
include model
to
been
AIO9K the
and
made
tests
part
(ref.
the
of
23).
conducted
with forces
a
full
160 knots.
quently, of
and
the
certain
requirements data
were
upon
input
and
(ref.
data
to
using
magnitude
and
UH-IH ically
rotor
the
use
uses
classical
tions
of
the
CH-47B real-time grams
for
use
Sigma
rotors
tail
the
the
uses
solutions in
externally
which
A model
dynamics
as
the
were
of
The
certain
of
the
OH-58D
and
and
moment
aircraft
model
was
nonlinear of
well
investigation
model
that
as
Subse-
24).
functions
small
conditions
force
of
of
to
problems
representation
terms
for
-40
(ref.
control
as
valid
simulator
System
aerody-
a function
of
trim
manufacturer. and
The
of
first-order as
range
aerodynamic
modeled
developed
equations and
a simulation
required
was
manufacturer.
directional
rotor,
the
this
fuselage, to
the
ground-based
developed
based
further
yaw-damping
relative
wind
by
it
total-force for
model.
suspended
rotor The
27)
and
and and
approach flapping
slung-load
for
moments
developed
simulation
a
simulator system
of
specif-
terminal-area
investigation
(ref.
representation
simple
model,
28).
for
of
The
similar
expressions
this
Vertol (ref. with
30).
model
to
the
that
of
contribu-
an
developed
in-flight
It
is
the
of motion.
time
DOF;
basis
has
for
This
of
been in
the
adapted
30
ARC msec.
tip-path
simulation
simulation
model
in
pro-
the
about
steady-state
for
use
nonlinear
implemented
cycle
option
29)
for
research
This
(ref.
rigid-body
includes
843
the
company
form
was
helicopter.
a digital
in six
equations
model
to support research
dynamics also
for
was
empennage.
Boeing
facility
and
and
uses
UNCLE
is operated
helicopter
augmentation
CH-47B
the
model
UH-IH
It has been used in simulations for the and guidance programs associated with an
simulations
simulation where
(ref.
forces
variable-stability
a
a Bell
stability
type,
Similar
ARC
of
investigations
V/STOLAND of
main-rotor
Model-
IX computer
model
plane
and
22)
simulation
Control
ARMCOP
ARC.
defined
the
data
efforts
AI09
terms.
values
form
is
requirements
a piloted
generate
ARMCOP
Army
for
degree-of-freedom
Bailey-Wheatley
model in
by
tasks (ref. 26). for the navigation
failures
piloted
using
simulation
The
known
of
a quasi-static,
the
RPM
the
the
the
at
inertial
a
test
Current
in
(ref.
airspeed
in
of
case,
an
Back-Up
to
off-line the
Model-
in flight
system
effects
AH-64
Italy.
VMS
model
flight
degree-of-freedom
supplied basis
the
display
allowed
ARMCOP
helicopter.
direction.
guidance and navigation development of software avionics
the
employed
effects
("UNCLE")
for
the
an by
control-sensitivity
as
this
and
and
for data
were
the
trajectory
model
moment
in
reference
reference
investigation In
supplied
include
and
was
25).
generated
a
the
conditions
used
a simulator
as
with
helicopter
six
the
AI09
inclusion
on
system of
particular
of
technique
for
modified
was
Apache
Italy,
Agusta
1986
for
gravitational
drivatives
model
of
SCAS
consisted
expressed
force
control
same
A similar
control
about
characteristics
helicopter
AH-64
its
flight
Aerodynamic
stability
spring
and
an
model
simulation
the
This
level
the
of
nonlinear
Army of
ARMCOP
digital
of
expansion
from
AI09
a piloted
are
airspeed.
perturbations as
of
U.S.
dynamics
the
AI09
initially
set
series
longitudinal
for
moments
the
flight
during
the
A model
and
a Taylor
of
model
between
the
investigation
The
namic
MOU
correlate
preparation
an
motion
of
to
development
AH-64A/OH-58Das
the
simulate
option,
of
the
of along
with
detailed slung-load equations of motion developed in-house (ref. 31}, will expedite research in areas related to sling-load operations. The CH-47Bmodel has been used in conjunction with flight research conducted on the CH-47Bresearch helicopter to develop a multivariable model-following control system (ref. 32) and to verify, in-flight, a control-system-design method using modern control theory (ref. 33). These research activities related to the control laws development are further discussed later in the paper. UH-60
(GENHEL)-
validation, from
a
ate
were
digital CDC
of
computer,
which
main
rotor
element
model
model,
for
speed Black
Hawk
from
lagging,
rather
than
the
has
CDC
been
drive
7600
computer
improved
train
modeling.
by
the
Black
basis trois
Hawk
accident
Other cific
Rotorcraft
rotorcraft
to NASA
the
than
as
from
In
35),
ref.
35
of
on
the
Also
for
VMS.
It
flight
and
available
real-time
at
ARC
simulation
flight
rules
models
described
flight
dynamics
extensive
in the
airworthiness
criteria
previously and
has
high-order
Traditionally,
(refs.
steady, 42,
qualities
the
43)
have
been
specifications
control-augmentation
41).
been
used
the
basis
(refs.
system
1-g for
44-47),
(SCAS)
for
of
the
to
be
stability design
rotorcraft.
844
of of
the
representaconduct
serves
as
speof
of
VTOL with
the
air-
instrument some
of
other
high-g
next.
DYNAMICS
as
motion
the
and
for
reference
control
analyses However,
small-disturbances flight
analyses, of
a
con-
several
phase
discussed
and
SH-3G (ref. 38), The XV-15 simula-
of
along
model
engine
a variety
investigations
airplane
flight
and
model,
in
FLIGHT
equations
rectilinear
development
investigation The
effects
PERTURBATION
standard
symmetrical,
(ref.
also
the
simulator
dynamic
SMALL
from
use
ground
covers
propulsion
are
during
utilized
it
also
in
the
small-angle in real time
diagram
to
in addition
such,
The as
is a blade
This improved highmodel has been used to
integrating
Models-
a block
of
a
well
It
area
tion
been
as
fidelity
in the
shows
interactions. simulation
investigations
developed
addition,
notably
SH-2F (ref. 37), one for for the XV-15 (ref. 40).
has
on
DOF.
and
a moder-
class
computer.
DOF
a math model for and a math model
model,
only
Sigma
a Sigma
rigid-body
model,
VMS).
acquired previously,
implementation
projects. They include one for RSRA (ref. 39),
craft,
was
had
Xerox
hub-rotational-speed
(ref.
benefits
models
for
six
Hawk
simulator
discussed
which the
machine
includes
and their real-time
Mathematical
math
Black
sideslip, and inflow, without using computer code was written to execute
simulation
to investigate potential (refs. 36, 70).
as
intended
ground-based
models
simulators (such
powerful
and
for
UH-60
other
force-and-moment
8 taken
tion of the simulation elements frequency, full flight-envelope,
was
mass,
(dedicated
Figure
ground
the
the
capability
more
total
considerably
use
on
program
for
all
Sikorsky
air
a
model
model
the full range of angles of attack, assumptions. From this model, the on
Army/NASA
Unlike
and
is a much
acquired
flapping,
joint
34).
expressly the
a
simulation
computational
GENHEL
of
(ref.
computers),
7600
UH-60
Aircraft
developed
level
part
blade-element
Sikorsky
which
As
the
modern
condition handling-
stability-andmilitary
rotorcraft are now being designed with a view toward expanding their roles in tactical missions such as combat rescue, antitank, and air-to-air operations that require high-g maneuvers that make frequent excursions to the limits of their maneuvering flight envelopes. Therefore, a new analytical framework is needed to permit a systematic examination of the flight dynamics and control characteristics of the basic aircraft and its SCASto ensure that the overall aircraft-SCAS system will perform satisfactorily, not only in operations near 1-g flight but also in high-g maneuvers. A fundamental characteristic associated with a rotorcraft with increasing load factor in high-g maneuvers is an increase in control effectiveness and damping, particularly in the pitch and roll axes. The extent of the increase depends, to a large measure, on the main rotor hub design. For a teetering-rotor helicopter, the control in pitch and roll is almost entirely through tilting the thrust vector of the main rotor; therefore, the increase in control effectiveness in these two axes is directly proportional to the load factor. At the other extreme, for a hingeless rotor the increase is much less because the direct hub moment, which produces most of the control power, is independent of the thrust level of the rotor system. The increase in the control effectiveness with the load factor has an obvious effect on the selection of the SCAS. Further, interaxis cross-coupling, such as pitch, roll, and yaw, that results from collective inputs and pitch-roll coupling which results from aircraft angular rates, also changes with load factor. The ramifications of these variations in stability-and-control characteristics for the handling qualities and the design of SCAsneeded to be considered. In addition to this extension of the linear model to high-g maneuvers, the frequency range of validity of the linear model must also be expanded for the design analysis of high-gain FCSsfor rotorcraft to meet the requirements for demanding mission tasks such as NOEflight and aerial combat. In the design analysis of such high-gain control systems, it is now essential that high-order dynamics of the system components be adequately modeled, in contrast to past practice in which only the lower-frequency, quasi-static, rigid-body flight dynamics were used in the design of low-gain FCSs. Recent flight investigations that used a variablestability CH-47Bresearch helicopter at ARCshowed that not only high-order elements such as rotor dynamics are required (refs. 48, 49, 32), but also other high-order effects such as dynamics of sensor filters, servo actuators, and data processing delays of the airborne computer must also be adequately modeled. Inclusion of the air-mass dynamics associated with a lifting rotor has also been shown in recent studies (refs. 49, 51) to be important in the design of highgain FCSs. The frequencies of the inflow dynamic modesare the sameorder of magnitude as those of the rotor blade flapping and lead-lag modes; therefore, the dynamic inflow has a significant influence on the aeromechanic stability of the rotor system. In the following sections, we will first discuss the linearization of the rotorcraft motion about a curved flightpath as a reference flight conditions, followed by a discussion of the high-order dynamics.
845
I
•
Linearization
of
Small-perturbation result
in a set
of
to operate
chosen
be a steady
to
motion
will
those
be
from
commonly
applied,
steady
Algorithms of
I) aircraft
2)
the
exists
been
these
(ref.
55).
of The
a study
several
results motions
for
helicopters,
single-rotor
flight
dynamics,
and
small-disturbance that
degraded
in steep,
and
turns
are
operations, to reduce
dynamic
computation
nated
turning
ordinated linear
magnitude aircraft table
decouple
1-g Once
about
the
bations inertial,
the
steep,
coupling
in
turn
has
is designed steady,
a
on
high-g
near
basis and
dynamic
and
lat-
turns,
significant
straight,
in operations
and
turns
longitudinal
the
normally
previously.
static
high-g
in coordinated,
of
from
of
levels
trim
level
and
governing
2)
influence of
that on
standard
level
I g becomes
direction
of
of
symmetric
flight
and
significantly
set
(ref.
positions of
trim
steep
for
a
in
general, for
an
general
uncoordinated
are
represented
extent
effi-
uncoordi-
and
steady,
the
steep
algorith_
permit
by
the
the in the
uncoordinated comparable
uncorecti-
ny (side force) at relationships shown
general, (to
to
algorithms
uncoordination
computation
the
56)
in a
turns
accelerometer signal closed-form kinematic
trim
rotorcraft
uncoordination,
extended
control
the
equations
the
was
uncoordinated
of the lateral gravity. The
simplify
and
2 gives
both
and
direction
turns
states
Table
asymmetric
and
coordinated
the
steady,
reference
equations operation
the the
motion
discussed the
these
which
turn
to
and
the
flight).
perturbation relate
the
greatly
perturbation
set
The
that
sideslip
and
flight.
including
and sign center of
thereby normal
by
maneuver.
flight.
strong
turns
such as in aerial combat, turns may intentionally be flown the turn radius. To investigate the extent to which the
for of
flight
of
as
are
computations
steep
In developing of
to
condition
first.
efficient
investigate
coordinated,
similar
operations
steady,
motion.
of
flight
established permit
is is
equations
perturbation
turns to
generally
equations,
be
will
flightpath
reference
influence
rotorcraft
SCAS
which
reference
the
that
of
the
direction
characteristics
expressly
cient
for
the
in coordinated
conducted in
equations
52-54)
to
I) that
an
flightpath
as
in coordinated
satisfactorily
turning
influenced
developed
that
performs
For some uncoordinated static
3)
curved
must
equations
the
equations
otherwise
(refs.
was
exists
a generic
Before
conditions
rotorcraft
eral-directional
43).
given
indicate
Turns
if
flight
positions
rotorcraft
algorithms,
characteristics
42,
flight
was
High-g
differential
1-g
refs.
control
Steady
small-perturbation
time-invariant
attention
in asymmetrical
Using
resultant
small-perturbation
special
about
However,
the
developed
and
About
differential
rectilinear
reference
have
associated
algorithms,
then
(e.g.,
states
motion
interpret.
linear
steady
employed
the
to
turn, of
of
Motion
time-varying
and
a set
obtained
most
equations
linear
difficult
Rotorcraft
time
rate
body-axis
are
from
and
of acceleration
motion
on
the
of
a steady
are
Euler
change
system,
aerodynamic
flight
of
and turn.
of 2)
by
and
then
This
Table
and
imposing
the
3 shows
846
two on
determined,
steps: the
the
a simpler
to
for
angular that
complete
terms form
small-
applying
of
the
equations
the
constraints
accounts aerodynamic
the
I) by
kinematic
roll-attitudes
development Also,
are
in
equations pitch-
coupling.
derivatives.
conditiolns obtained
the
pertur-
kinematic,
include the
that rates
a
complete
stability
and
control matrices in which the acceleration derivatives are neglected. The equations are given with respect to the general body-axis system and they are cast in the first-order, vector matrix format to which manyefficient software packages can be readily adapted. These equations were implemented in conjunction with the trim algorithms for generic uncoordinated, steep high-g turns in a variety of nonlinear simulation models (refs. I, 34, 40) to investigate a tilt-rotor aircraft and two single-rotor helicopters in various levels of uncoordinated, high-g turning maneuvers at low speeds. The results show I) that the aircraft trim attitudes in uncoordinated, high-g turns can be grossly altered from those for coordinated turns; and 2) that within the moderate range of uncoordinated flight (side-force ny up to ±O.1 g), the dynamic stability of the rotorcraft is relatively insensitive. However, the coupling between the longitudinaland lateral-directional motions is strong, and it becomessomewhatstronger as the sideslip increases (ref. 57). The results of a recent study conducted in a European laboratory (ref. 58) generally confirmed those of ARC. In particular, their results also indicate that in high-g turns, the coupling between the longitudinal and lateral-directional motions is strong. Consequently, the conventional short-period approximation and other approximations (ref. 59) suitable for rectilinear cruise flight become inadequate for predicting stability and response characteristics of the helicopter in high-g turns. As in the Amesstudies (refs. 55, 57), their results for turns also show that all the helicopter stability and control derivatives change with load factor (or bank angle). The variations in these derivatives are caused by aerodynamic, inertial, kinematic, and gravitational terms, but it is primarily the increased aerodynamic terms that have the most influence on the short-term dynamic modes.
Considerations for High-Order Dynamics The increasing use of highly augmenteddigital FCSs in modern military helicopters has prompted a recent examination at Amesof the influence of rotor dynamics and other high-order dynamics on control-system performance. In the past, industry has predicted stability augmentation gains that could not be achieved in flight (ref. 60, fig. 9). The operators of variable-stability research helicopters have also been aware of severe limitations in feedback gain settings when attempting to increase the bandwidth of FCSsneeded to assure good fidelity during in-flight simulations. Now, with an increasing emphasis on high-bandwidth mission tasks, such as NOEflight and aerial combat for military helicopters, coupled with the development of new rotor systems and the trend toward using superaugmented, high-gain, digital FCSs(refs. 19, 61, 62), there is a widespread need for improved understanding of these limitations. Therefore, a study was conducted at ARCto correlate theoretical predictions of feedback gain limits in the roll axis with experimental test data obtained from the variable-stability CH-47Bresearch helicopter. The feedback gains, the break frequency of the presampling sensor filter, and the computational frame time of the 847
flight
computer
theoretical
and
dynamics, usable
were
experimental
sensor
values
filter,
of
the
In addition in
the
design
dynamic same
order
motion.
A study inflow
hover.
Linearized
and
on
Fridovich
rated
in
68)
and
the
of
the
and
the
and
other
by
models
and
blade
number
(ref.
Lock
linear
dynamic
mode.
duced
the
by
also the
shows
that
destabilized
dynamic
inflow,
acceleration
response
becomes
pronounced
more
Pitt
rotor-body
of the
flapping
inflow
to an as
were
flapping
abrupt
in a input
either
the
motion
along initial
the
in
the
thrust
coefficient
effects
the
of
67),
were
Carpenter
incorpoin
a good
in
by
variations
thrust
correlation
transient and helicopter.
frequency The
in destabilizing
the
inflow
the
mode
in
pitch. or
of
helicopter
overshoot
collective
of
developed
role
with
on
are
rotorcraft
the
In addition,
key
63-67)
modes
modes;
of
for
significant
lead-lag
(ref.
large
also
modes
Peters
mode,
the
the
one
a
flapping
limit
and
models,
plays
rotor
(refs.
investigate
analysis, and the variable-stability
inflow
be
dynamic
in
compared
49).
linear CH-47B
results
and
can
flapping
vertical
the
severely
research
changes to
excellent
gains.
inflow
blade
Ames
dynamic
was obtained between the results responses measured in-flight on analysis
rotor
can
dynamics
the
showed
that
delays
Recent of
significant
flapping two
indicate
inflow
at
which
feedback
rotorcraft.
conducted
of
10),
processing
frequencies
produce
therefore
results,
roll-attitude
for
those can
versions
(ref.
{fig.
dynamics,
the
rotor-blade
simplified
coefficient
as
inflow was
dynamic
FCSs that
magnitude
dynamic
and
flapping
shown
The
digital-data
roll-rate rotor
varied.
correlation
and
high-gain
has
of
therefore,
to
of
inflow
systematically
the
This blade
the
intro-
vertical overshoot
Lock
number
is
reduced. The system
influence
of
the
design
for
a helicopter
(ref.
69)
under
Curtiss attitude
feedback
gain
ics
Beyond
the
system
dynamics
and
is
lightly
damped
fuel-control dynamic
rotor/airframe icists that
have are
flight-test modifications propulsion the ref.
airframe
can
lag
degrees
the
of
when
opposite
approach. design
a helicopter
dynamics
the at
in the
rather
freedom.
An
rotor
the
levels
design
of
and
effect and
are
within
the
drive the
a
can
of
70).
848
the
surface
program,
Therefore,
both
system.
result,
it
fuel
train
bandwidth
the
propul-
flight
dynam-
have
of
the
engine
a sophisticated for
the
later
to
dynamproblems
ground-
costly
compatible system
flight
interface
in the
important
engine
helicopter
Helicopter
control
rate
verifica-
systems
requiring is
that
the
helicopter
dynamic
sophistication the
but
dynamics,
use model
by
showed
experimental
inflow
on
rotor
control
stage
He
of
manufacturers
As
analytically
flight. coupling,
development
problems.
hover
rudimentary
the
automatic-control-
body-flap
which engine
a
the
by
a profound
designing
in the
to rectify
dynamics
with
on
investigated
near
by
helicopter modes
freedom
been
for
caused
have The
dynamic
anticipated
system
grant
Traditionally,
dynamics
phases
recently
effects
in conjunction
of
primarily
the
also
torsional
used
not
by
qualities.
system.
model
has
limited
high-order
handling
degrees
a NASA-ARC
feedback gain is limited tion is needed.
sion
lead-lag
or
add-on
model
the
with
those
of
FCS
(see
and
the
FLIGHTCONTROL LAWSDEVELOPMENT
A variety of methods have been used to design rotorcraft flight control laws for handling qualities investigations. They range from classical frequency-domain design methods to modern time-domain control methodology. Classical frequencydomain methods were first used in the design of control laws to provide a wide spectrum of control response characteristics for experimental determination of their suitability for various mission tasks. These designs were performed mostly in the continuous (or analog) s-domain. To expose potential problems associated with digital implementation, especially for high bandwidth digital control systems, an extensive case study based on the ADOCS was conducted in a discrete z-domain and w-domain. Modern methods for time-domain control law design were subsequently employed in several case studies. Lienar quadratic regulator theory was applied to the design of a high-performance SCASfor a hingeless rotor helicopter for piloted evaluation on a ground-based simulator. An LQR-based, low-order compensator method was applied to the design of a hover hold system for the CH-47 research helicopter as part of the collaborative efforts with Stanford University. An optimal cooperative controllaw-synthesis method, which includes an optimal pilot model in the design procedure, was modified and applied to a tandem-rotor helicopter and was evaluated in a piloted ground-based simulation. A multivariable MFCSwas developed for the variablestability CH-47Bresearch helicopter to enhance its in-flight simulation capability. Generic Control Laws for Various Types of ResponseCharacteristics Generic FCSswhich can be configured to provide a variety of helicopter response characteristics including rate and attitude were implemented in the basic ARMCOP model (ref. I) and the ARMCOP/UH-60 model (ref. 18) for handling qualities research. The general form of the SCASthat was incorporated in the ARMCOP model employs a complete state feedback as well as a control mixing structure that facilitates implementation of control crossfeed, with control quickening from each of the four cockpit control inputs. Also, the augmentation-system gains may be programmed as functions of flight parameters, such as airspeed (fig. 2). This constant-galn configuration was subsequently modified (ref. 20) to include dynamic compensation elements in order to represent the SH-6OBfor the handlibng qualities investigation of its shipboard operations. A more complicated implementation of the generic FCSwas incorporated in the ARMCOP/UH-60 for the development of the Army's ADOCS. As part of the ADOCS program, control laws suitable for an attack helicopter mission were synthesized, evaluated in piloted simulations of both visual (ref. 71) and instrument flights (ref. 72) under various meteorological conditions, and implemented in a UH-60 demonstrator helicopter. Figure 11 presents a block diagram of the FCSdesign for the ADOCS program. The primary flight control system (PFCS) shown in the figure was designed to yield satisfactory unaugmentedflight by providing feed-forward command
849
augmentation
and
stabilization tion
feedback
compromise allowed
loops
for the
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in
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hold,
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tigation
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control
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so
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as
41). be
little
the
dynamic
Implementation Proposed
concepts
ble,
versatile
success
as
qualities tasks.
vehicle
the
These
DFCS.
The
requirements
gap
rotorcraft
smoothing the requirements. A study I. systems, 2. 3. digital
between
flight
illustrate systems
with
A comprehensive Methods discussed control
for
analyzing
and system,
of
the
a
is
74)
concern
for
concepts
based
on
many
were
inteare
and
were
kept
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as
primarily
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Takeoff as
and
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feed-forward constant
Systems
Joint highly
important
Services maneuvera-
to mission
require
basic
inves-
simple the
handling
stabilization
high-gain,
multimode
low-authority, Ongoing and
to pro-
instrument-
Vertical
operations in
model
low-bandwidth
research
advanced
aims
at
concept
to
case
the
NOE
pilot
state-of-the-art
Figure
73)
complex,
are
technology
study
including
and the
and
current
designing
and
of
simulation
(LHX)
considerable.
case
and
stabil-
a ground of
full-authority,
requirements
study
design
range
XV-15
class
in a
which
of
demand
important
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command/attitude
Digital
Helicopter
Single-pilot
specific
a
the
employ
embodied
systems
involvement
the
control
response
Consequently,
High-Gain
are
a detailed
illustrated.
tilt-rotor
Family
(JVX)
(ref.
review
areas
for
Light
between
conducted
extensively
expose
mechanizations
technology
transition
was
The
avionics
these
control
pilot's
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(ref.
the
required.
will
no model
configurations
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for
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shaping
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rejection;
system
generic
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minimize
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SCAS
with
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with
command,
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to
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authority
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a matrix
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for
configurations.
12 in
control
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helicopter
airworthiness
ble
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designed
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side-stick
identified
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ref. needed
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74)
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Hawk
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attitude
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6
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C
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on the variable-stability is discussed briefly in
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Methodology
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15)
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robust,
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intersample
multivariable
technique,
techniques
130
the
digital-system
is underestimated.
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feed
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fo
system)
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ground-based Aircraft
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851
1
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placed
designed
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experiment with
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designed
Robust,
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laws is
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plified time and
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summed
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the in
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hover-hold implemented tested
for
discussed
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1984.
pose
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elements:
of
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acteristics
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useful
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852
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of
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whose for
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investigation
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17.
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of
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a direct
figure
characteristics
achieving
in
simulation
of
consists
rotorcraft),
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of
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schematically
requiring
provide
description
33.
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simulation, advanced
of
reference
desired
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operating
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compensator.
flight
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simulation
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ranges
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on
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Control
attractive
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in-flight
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law
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as
These
design
off-normal
of
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helicopter. These two control systems were CH-47B research helicopter and were flightthe
to
output
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of
represent
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to
and
design
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the
is
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algorithm
to
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compensator
order
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eliminated.
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produces
design
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of
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method,
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The
proper
of
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obtained
pair)
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mode. of
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control law
motion
rotorcraft.
be
(I)
77),
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desired
Model-Following
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order
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matrix of
of
33).
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sharing
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A command
results
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mode
implementation
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applied
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The
methodology
Multivariable (3)
was
part
system for a tandem rotor on the variable-stabflity
design
three
outputs
residue
(ref.
the
After
with
I) were
control
(ref.
standard
compensator
the
involves
outputs.
controls
the
uses
at
step
16.
the
of
real
and
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command
of
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performance
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in figure
combined
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of
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performance
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measures
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tions.
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quadratic
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course
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II and
diagram
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qualities
in contrast level
Stanford
a flow
reduced
barriers
Design
by
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handling
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at
dynamic
pensator
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Compensator
illustrated
facilitate stable
of
of
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was
task--flying
operational,
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for
experiment
satisfactory
borderline
Low-Order
methodology control
that
the
The
centerline
indicated
qualities (near basic aircraft.
method
the
SCAS.
the
be
duplicated
two
generations
a
for
studies.
model-following
future
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in which
In
concept of
rotorcraft. handling the
By
concept
where
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the
of
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tem. and
in
in
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tial
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delays
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32).
the The
as
model
and
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(I)
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in
no
of
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is an
of
of
system
the
method
preceding priori
inherent
design
feature
SCAS
the
The
CCS
design
design
model
control
syssystem in
feature, was
included
task
to
assumed method for
a
criteria
be
was
model
developed
fixed-wing
of
while for
aircraft
rather
the
CCS
because
an
(fig.
criteria task
through
designed
limiting
the
the
SCAS
previously
applied
and
was
on
a
and
design
synthesis distinct
state
requires,
use
analytic can of
be
feedback
of
an
pilot-model a great the
need
for
is based the
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inputs. the
fixed-based
In
prin-
explicit
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to
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pilot
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because
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performed.
22);
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fig.
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model-
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21).
exist
the
implementation,
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method
being
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32.
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and
19,
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design,
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frequencies
reference
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eliminated
The
natural
Similar
t_e
original
example
method
high-order
that
MFCS
cooperative
CCS
the
ini-
time
optimal feedback
schematically
performed.
pilot
is
in
the
used
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the
by
characteristics
reported
to
analysis
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an
the
computational
control
the
on
variable-stability
high-bandwidth
shows
of
design or
of
Details
approach
developed
multivariable
with
methods,
the
existing
(depicted
An
model
criteria, of
controlled
of
is dependent
improvements
caused
section.
20
making
design
no
a priori
output
thereby
being
the
the
improvements
and
systems
However,
uses
the
delays
achieves
The
are
on
a feed-forward
quadratic
theory.
method,
three a
the
where
only
on
the
actuating
actuators,
that
time
Figure
0.707.
in cases
pilot
the
initially
limitations
features
ratios
LQR
CCS
LQR-LS
the
optimal
of
on
and
ground-based
MFCS
switching
dynamics,
four-axes
axis.
aircraft
load"
basic
scheme,
nature
on
the
roll
were
large
preceding
final
advantage
explicit
using
began
Army
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the
Significant
clear
filter
Cooperative-Control
uses
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of
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demands
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of
to
structure
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satisfactory
example
preceding
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sensor in
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laws
18),
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Quadratic
(CCS)
of
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higher
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the
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when
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control
performance.
compensate
development
performance
method
to
discussed
following
flight-test
on
position-
feedback-compensation
rad/sec
The
the
placed
implemented
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model-following
1.4
in
program
(DFVLR).
and
the
is utilized.
research that
control
(fig.
needed
final
complementary"
were
MFCSs
achieved
for
discussed
model-following
joint
model
were
were
excellent
mented
a
bandwidth
account
rotor
48)
in
ADOCS
model-following
helicopter
dynamic
resulted
the
indicate
model-following
as
(ref.
high-order
78)
explicit
were
such
of
the
simulator
design
of
in
rotorcraft.
system.
research
effects
augmented
the
Establ_shment
21,
to
characteristics
for
multivariable
of
designed
ground-based CH-47
part
performance
control
When
the
degraded
model-following
desired
single-output
as
Research
Increases
FCS
of
(refs.
resulted
which
automatic
simulator
dynamics
the
assured
the
Aerospace
the
be
is
investigations on
may
development
ground
German
incorporating
qualities
longitudinal ground
simulation
evaluation,
being
on
used
helicopter, (using two
which
the
other
Results
has
designs a
to
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aircraft.
original
from
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complex
modified
based
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detailed
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Parameter in
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for
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priori
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or
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parameter
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field
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issues
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with
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all
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in
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that
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correlated
with
in response
ear-
system;
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levels
rotary-wing
helicopters;
train/rotor
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state
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Vibration
inadequate
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accurate
dynamics
dynamics
freedom
identification: be
79).
or
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the
drive
identification
to
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is concerned
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important
aircraft,
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rotorcraft
likely
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resolved.
number
direct
last (refs.
contamination
basic
design
obtained
design
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therefore
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engine
degrees
form
without
may
techniques.
for
with
CCS
was
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aircraft. which
aircraft
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identification
contents
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to achieve
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used
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itself
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coefficients
handling-qualities
fixed-wing
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difficult
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causes
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eters
design
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obtained
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dynamics
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information
rotor
number
leads
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such large
dynamics
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for
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for
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of
of
system
to
designs
method
was
knowledge
determining
models,
develop
process
test
CCS
helicopter
indicate
and
for
IDENTIFICATION
motion
from of
Two
a CH-47
frequency-domain
identification
simulation
While of
of
Parameter
rotorcraft
of
is derived
more
difficult
is a
equations
application
frequency-domain
simulation
criteria),
identification set
system
dynamics.
PARAMETER
eters
augmentation modified
flight
classical
design
the was
method
methods)
piloted
with
with
design
classical
fixed-base
favorably
favorably
This
case
record, modes,
responses,
short
param-
if
can the
and the
with
Early efforts were madeby the Army and NASAin the development of advanced time-domain techniques for rotorcraft state estimation and parameter identification (refs. 83, 84), in attempts to overcome someof the difficulties described previously. Considerable efforts were subsequently devoted to the development of frequency-domain techniques (refs. 85-87), thereby providing a better perspective from which to assess the two approaches, and leading toward the development of a unified time- and frequency-domain parameter identification methodology for rotorcraft in the future. Time-Domain Parameter Identification First applications of time-domain (digital) parameter identification techniques to rotorcraft by NASAand the Army at Langley and elsewhere employed a measurement error method--Newton Raphson(ref. 88) and a simpler advanced method using the Extended Kalman Filter algorithm (refs. 89, 90). Typical procedures of using these two parameter identification methods are shown schematically in figure 23 (ref. 91). Both methods include the initial step of using a digital filter to process the raw flight data to reduce the data noise content. Applications have been made to the identification of quasi-static, rigid-body stability-and-control derivatives of single-rotor helicopters and a tandem-rotor helicopter. Both methods give a gross underestimation of primary derivatives such as roll, pitch, and yaw damping; it is not uncommonfor positive values of the damping derivatives to be identified using the quasi-static rigid-body model. If the lower-order model is used, large fitting errors in someresponse variables (e.g., vertical acceleration) are also apparent (fig. 24). The then-available identification software and the lack of measurementsof the rotor blade motion have limited those applications to the identification of only the rigid-body quasi-static stability-and-control derivatives without considering the effects of rotor dynamics and other high-order effects discussed in the earlier sections. In addition to adequate modeling of the vehicle/rotor system, two other areas must be addressed to accurately identify the stability-and-control parameters: (I) instrumentation and measurementdata analysis and (2) test input design. A joint Army/NASAprogram involving both Amesand Langley was therefore initiated in 1976 with the aim of developing a comprehensive advanced technique for rotorcraft state estimation and parameter identification, which addressed all aspects of problems peculiar to rotorcraft. The techniques developed by a contractor (ref. 84) are illustrated in figure 25. Applications of someof these techniques have been made to the Rotor System Research Aircraft (refs. 92, 93) and to the Pumahelicopter (ref. 94) under a NASA/UK(Royal Aircraft Establish) collaboration. As part of an ongoing US/GermanMOUon helicopter flight control, an extensive joint study is being conducted to analyze the XV-15 database using both time domain and frequency domain techniques. The objectives of this study are to gain a better appreciation for the relative strengths and weaknessesof those two different approaches and to develop improved methods of identification for rotorcraft. The time domain approach used by the DFVLRof the Federal Republic of Germany(FRG)
855
(refs.
95,
analysis eter
96)
is shown
blocks
shown
identification
tional
in
figure
the
The
with
this
26.
figure
described
algorithms.
conjunction
in
in
are
25,
domain
effort
shown
in figure extraction
27.
lateral-stick are
shown
ure
28(c).
in
figure
condition
so
likely
smooth (3)
input
that
the
stay
the
and
format: These
can
These
used
nonparametric
obtained
from
discrepancies
in
characteristics plots
with
ric
models
and
for
the may
assumed that
terms.
Since
extracted,
for
effects. inputs
The
tion
was
transfer
for
of
the
transfer
transfer
extracted
time-domain
function
identification
helicopter.
1983
open-loop
and
of
completed
dynamics
of
The
trim dynamics forms
frequency based
on
range. the
responses
between
in Bode-plot
vs.
frequency
has
been
selected
(fig.
27).
assumed.
As
directly
expose
limitations functions
with and
modal
frequency-response
The
results
are
paramet-
frequency
the the
studies
equivalent-system
carefully
with
those
and
control-system-design
includes
such,
testing.
compared
the
are
and
presented
lower-order be
driven
fig-
identifica-
wave
response
selected
frequency-response
to avoid
methods
important
is an
are
coupling
flight-test-control
characteristics. procedure
single-rotor The
in
behaved;
desired
is
XV-15
used.
the
output
identified
after
can
which are
response
Identification in
in
is completed
matrix
are
aircraft
well
function.
given
models
a BelI-214-ST
research
the
procedure
and
transfer
the
Multiinput/multioutput a
the
to
transfer-function-based
specifications
the
model.
be
Approximate fitting
extracting
initiated
document
also
of
Frequency-Domain
and
can
by
useful
input
simulations
models.
the
the
shown
about
methods
structure
models
aircraft,
tandem-rotor
results
and
86}
for
of
handling-qualities-compliance
obtained
frequency-domain
tilt-rotor
model
85,
concatenated,
tests
inputs
the
are
the
be
order
verify
to
or
in
inputs
response
are
frequency results
(refs.
typical,
flight
input
employs
no
nonreal-time
the
approach
design
paramcomputa-
Army
frequency-domain
over
output
since FCS
simulator
fitting
Finally, to
and
qualities
overparameterized suitable
for
also
this
the
the
and
U.S.
ARC
symmetric
constant
analytical
are
handling
of
the
functions
high-resolution
identification
real-time
(2)
at
rate
excessive
spectral
ARC
to
not
identification
nonparametric directly
roll
is roughly
range;
the
hover
suited
is generally
phase
the
well
are
the
Two
computer-generated,
motions
data
in detailed
frequency-sweep
than
linear
The
and
using
corresponding
resulting
extract
developed
during
form
estimation
by
verification.
wave
analysis,
to
are
be
the
the
pairs.
magnitude
the
aircraft
spectral
output
the
rather
autospectrum
results
they
model
(I)
so
z-transform
input
generated
for
with
within
regular,
input
For Chirp
are
is especially
because:
to
and
the
28(a)
and
Identification
approach
completed
state
different
employed
Parameter
data
sweeps
the
analysis
next.
inputs
Pilot-generated,
procedure
are
step
frequency
frequency-sweep tion
Flight
and
to
approach
frequency-domain-identification
model
compatibility
although
is discussed
Frequency-Domain The
data
similar
figure
frequency
MOU
The
results the in the
856
has
been
helicopter, are
XV-151986. XV-15
briefly The The
from
applied
to an
and
NASA/Army
the
described
objectives tests
CH-47B
below.
frequency-domain
flight
XV-15
were for
identificato
identify
several
operating conditions including hover, to compare response characteristics for identifying problem develop system detail
a validated
transfer-function
model
studies. The results for hovering in references 86 and 85.
the aircraft and simulation areas in the math modeling,
description
flight
for future
and cruise
flight
and to
use in controlare reported
Figure 29 shows an example of a comparison of the frequency responses, extracted from flight and simulator data, of the open-loop roll rate response lateral
control
input in hovering
flight.
The correlation
to
of the VMS simulation
the flight data which indicates
is quite good for the frequency range from 1.0 to 10.0 rad/sec, that the roll-response control effectiveness is accurately mod-
eled.
considerable
However,
low-frequency-magnitude the damping ratio tion model (i.e., dentally, during
these
response.
of the unstable more unstable),
low-frequency
the pilot's
Subsequent
discrepancies
analysis
The low-frequency
in the math
phase
model
comparison
and
for the
suggests
that
roll mode is slightly overestimated by the simulawhereas the natural frequency is accurate. Inci-
errors
qualitative
are apparent
in
in the simulation
evaluation
of the real-time
model
were also
reported
on the simulator. math model
indicated
problems
in the
representation of rotor flapping for large lateral-velocity changes (such as the case of the low frequency range of the roll response). There is also strong sensitivity of the numerically linearized transfer functions to the size of perturbation. Corrections to the math modeling in these two areas were included later in the nonreal-time XV-15 simulation. The comparison between the current nonreal-time model,
real-time
significant
model,
improvements
and the flight achieved
data
during
is shown
in figure
29, and indicates
the
the last 3 years.
Having completed the extraction of the frequency responses, the next step is to fit the frequency response with a transfer-function model. A standard fourth-order model with an effective time-delay term was chosen (ref. 86) as the structure of the model for identification of its attendant parameters. Figure 30 shows a fit of the magnitude and phase of the identified transfer function. The predictive capability of the transfer-function model is illustrated in figure 31, which shows the rollrate response of the open-loop aircraft to a step aileron input. When the identified transfer function is driven with the same input, the response coplotted in the dashed curve is obtained, which shows the model and flight data responses generally compare
very
well, and thus provides
Demonstration
a validation
of Frequency-Sweep
Testing
for the identified
Technique
Using
a Bell
model. 214-ST
Helicop:
ter- Research supporting the development of the LHX-handling-qualities specification ADS-33 (ref. 97), which is an updated version of MIL-H-8501A, indicates the need for frequency-domain
descriptions
to adequately
characterize
the transient
angular-
response dynamics of highly augmented combat rotorcraft. The proposed LHX criteria for short-term angular response are given in terms of two frequency-domain parameters--bandwidth (mBW) and phase delay directly from frequency response plots
(Tp). These quantities are determined of the on-axis angular responses to control
inputs, such as was generated from the XV-15 (fig. 29). A key concern in incorporating such descriptions in a specification is the practical problem of extracting frequency
responses
from flight
data
for compliance
857
testing.
To
address
this
frequency-sweep hours)
was
(fig. (90
32).
the
each
frequency
shown
for
the
hover
over
compliance
ducted
to
flight
domain
of
craft
to
the
(ref.
for
The
correlation
response
frequency
study
of
and
(ref.
fied
49).
the
to
therefore
flight the
to
the
for
each
cyclic
the
axis.
As
stick
spectral
and
of
conditions.
accurate
and
Model
identification vertical work
required
analyses
These
an
is
estimate
is
specifi-
were
models
con-
accurately
validate
the
linearized
in Hover-
The
same
of
dynamics was
developed
to
the of
two
the
identify
from
all
data
the
frequency-
aircraft
CH-47B
the
was
also
research
helicopter
analytical
a means
models.
These responses in figure
frequency vertical
range
the
air-
vertical
modeling
efforts
the As
of
acceleration
corresponds
fits
range
of
0.1
to
for
the
frequency
than
the
(ref.
the
compare identified
applicability, owing
to
capability
in collective
favorably
expected,
models the
with are
identiquasi-
flapping
and
caused
and
by
inflow varia-
a fourth-order
model,
instead
it proved
range;
of
0.1
first-order
the
to
20
model
models
as
to
fit
rad/sec
to match
(fig.
characteristic
completely
high-order
858
of
input those
plotted
first-order
fails the
the
34).
All
predicted
in
49).
predictive
input
of
to
parametric
classical
higher-order phase
of
the
frequency
the
around analytical
fit
effects
fre-
extracted
the
series
a fitst-
3 rad/sec
a nonminimum
in
the
at
was
effects
entire
low
The peak
quasi-static
causes
exhibit
to
possible
first-order over
a
order
the
This
a step
of
model
for
identify
input.
resonant
efforts,
fifth
includes
to
predicted
to
models.
testing
35.
modeling
accurately
efforts
responses
previously
to account
the
is a
other
at
modeling
For
employed
first
model
used
model
to
to
from
first-order
there
as
analytical
34.
models
for
the
lead
were
to collective
that
frequency-response
the
better
responses
the
the
of
higher-order
As
The
in figure fit
phase
was
pitch
acceleration
indicates
fourth-order
limited
analytical
shown
flight
Additional
cruise
frequency-
helicopters.
collective
ranging
The
rpm).
shown
difficult
applied
on
fifth-order
rotor
are
34)
models,
vertical
of
longitudinal
behavior
Dynamics
this
those
vertical
Based
and
(the
in
model
the
plots.
model,
dynamics
the
of
in
a substantial
frequency
static
of
the
both
rad/sec),
and
the
identification
to
obtained.
models
in the of
with
(fig.
transfer-function
as
used
inputs
response
rad/sec
was
(0.2-10.0
in hover
at
An
flight
helicopter
using
Excellent
33.
(6
using
50).
quency
be
analyzed
in figure
Vertical
objective
Frequency-sweep
tion
was
performed
then
single-rotor
identification
in hover.
dynamics
for
program
were
axes
of
BelI-214-ST
were
attitude
response
practicality
tests
all
readily
step
CH-47B
that
for
the
instrumented
previously.
pitch
function
with
demonstration
an
data
range
are
concept
procedure
applied
frequency
transfer
Identification
of
condition
large-amplitude
frequency-response
The
achieved
parameters
identify
the
flight-test using
described
response
a broad
cation
predict
was
associated
step-input
axis.
procedure
extracted
a 1985
and
control
responses
the
achieved
17
technique,
Frequency-sweep for
concerns
in October
identification
example,
other
testing
conducted
knots)
domain
and
of
effects
identified generated
the
with
because
predict of
models, from
analytical
together
models, to
the
were
inflow
of
the
model.
flight the
data
Some as
limited
overshoot
and
the
the
flapping
of
the
dynamics. does the
The fourth-order first-order model
model provides for the initial
a much better transient.
CONCLUDING
This ing
paper
has
rotorcraft
parameter tion
handling the
pilot
research
a
for
required
rotorcraft
characteristics, that have been are
currently
of
required
is probably
acute
dynamic results
for
implications
in performing
made
research
a variety
of
mission.
Although
all
of
way
to
design
than
concern-
require
aimed
at
integrated
aircraft,
atten-
the
approach
need
complexity,
controls,
the
assisting to
is particu-
high-order
requirements. Accordingly, basis for combined research
dynamics,
and
experimentally
concepts this
of
all
and
mathematical
integrate
research
methodologies,
disciplines
dynamic
classes
their
NASA/Army
analytically
and demanding mission reviewed here form the
under
joint
control
exploring
for
because
in
flight
interactive
a basis
capability
REMARKS
progress
modeling,
These
to provide
qualities
the
which
the
identification.
in order
larly
reviewed
flight-dynamics
predictive
and
the efforts
identification
methodologies. The here. led
need
for
As was
to a capability
disk ate
and
more
for
which
the
types
require
simplicity
for
greater
high-g tion the
of
To
design
and
must
It
their
is also must
The of
model-following
models
that
are
dynamics
have
of
showed
that
details
an
and
existing
that
the
into
paper
are
the
joint
work
explicitly
to
and that
higher
important,
achievable
do
reviewed early
been
process,
suited for
here
the
developed
control
terms,
in the
aerodynamic
frequencies the
been
rotorcraft practices
has
in
account
control
system
859
the
that
and
models
the
be
improved
performance
design for
and the
remains
of
influlower-
order
regardless modern the has
itself
of
control high-
utilized
control
control
as
developed
higher
demonstrated
implementation
sufficiently
data
the
selection
for
for
design
flight
process,
accurate
identifica-
procedures
these
of
adequate
paper
parameter using
rotor
missions
effects
must
in
dynamics;
rotorcraft
the
has
appropri-
retaining
importance
(inflow)
digital-control-system not
for
to assessing
design
to achieve system
overlooked
extended important
described
basis
demonstrated also
been
frequency-domain
rational
for
have
while the
models
full-flight-envelope
modeling the
for
experiments
accurate
excellently
a
dynamics
work
higher-order
the
providing
historically
current
the
be
the
modes
reviewed
initially
must
Further, the
more
particular,
this
from
accurate
Equally
review
of
system
performance. that
for
and
flight
rotor
purposes.
work
simulation
models
include
elastic
envelope;
basis
In
or
the
modes, These
but
to
of
real-time
flapping
to date,
lag
importance
be accounted
origin.
as
integrated
in
clear
such
most
on
models.
performance
flight
standard.
dynamics
applications gain,
be
blade
considered
the
the
from
research
element
simulation
the
forms
discussed
ence of these order models.
dynamics
and
the
rigid
blade
freedom
of
ascertain
verification NASA
including using
missions
regions
techniques
is apparent
paper,
pilot-aircraft of
maneuvering
tools.
in the
of
more
degrees
over
integration
recently
additional
at
this
reviewed
system adds
designs;
the
implementation digital far
design
less
than
was
predicted.
Therefore,
inevitably
pointed
frequency
ranges
effects,
and,
oriented
in
The
among be
the
craft.
be
The the
combat
need
and for
and
modeling
limiting shown,
a
perform modeling integrate past
and
closer
control,
design
for
that
and
in
the
methodologies
the
with
past
10 yr
accurate
a variety
research
a
has
As
the
has
over
of
become
all
procedures
technologies
that
of of
of
higher
interactive increasingly
higher previous
capable have
work
of been
dealing initiated
10 years.
86O
with in
the
be
considered
integrated
and
envelope
in this
techniques is
these
stems
stability/control
control,
goal
may
improvements
must
include
and
hence
rotor-
air-to-air
requisite
presented
The
and the
as
is
interaction
rotorcraft
such
bandwidth
knowledge
of
elements
harmonic
elements.
the
the
elements
controls
more
systems,
missions
achieve
high
and
and
details of
interactive such
existing these
actual
details
To
control,
transfer,
extension of
of
dynamics gains
rotorcraft
rotorcraft
process;
review
the
to the
flight.
state
flight higher
to the
variety
design
of
coupled
demanding
rotor
even
dynamics coupling
on
energy
rotorcraft
require
closely
control
integration
the
conducted
explicitly paper,
nap-of-the-Earth
cueing.
and
models
this
various
emphasis
considerable the
the more
rotor-rpm
and
in
maneuverability,
flight/propulsion augmentation,
work
dealing
research
this
automated
in agility
for
of
concepts
becoming
increasing
and
in the
NASA/Army
controls
to
need
the
direction.
to examining
said
from
the
capable
demonstrated
this
current
oriented
to and
as
in general,
to
new
joint
paper
is
required
provide problems, research
has to
systematic and of
to
the
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TABLE
2.-
A.
ALGORITHMS
Steady
FOR
COMPUTING TRIM CONDITIONS UNCOORDINATED FLIGHT
Uncoordinated
Steady-state
FOR
A ROTORCRAFT
IN
Turns
Euler
equations
nx
- sin
0
-
tan
_z(sln
a cos
ny
+
cos
9
sin
@ -
tan
_I
nz +
cos
0
cos
_ +
tan
_z(sln
cos
L + Iyz(q
2
6 cos
O sin
¢ -
8(cos
a cos
0 cos
B sin
O
+ cos
sin
6 cos
0
cos
¢)
= 0
sin
_
sln
9)
= 0
B cos
e
sin
@)
= 0
@ +
a cos
-
r 2)
+
Ixzpq
-
Ixyr
p +
(ly
-
Iz)qr
_
lyzp
q +
(i z
_
Ix)r
p _
Ixzq
r
(i x
_
Iy)pq
M +
Ixz(r2
-
p2)
+
ixyqr
N +
Ixy(p2
-
q2)
+
iyzr
+
= 0
p
= 0
-
0
-tan-1 ) =
-+ tan-Z
-
L
cos
y
+
j
right
n 2
m
turn;
n 2
"b
n 2
'4" n 2
y
z
x Kinematic
q -
- left
turn
relationships
_ sin2@z{
-
(sin
y sin
8 + ny
cotan2@l
) 2
±
_sin
q
+ _z
tan
p!
B.
m
-
y
sin
B +
ny
tan
8
(sin2y
q
a
-
r w sin
r
= pt
sin
a
+
r t
e
=
¢
= tan-Z(q/r)
Euler
Straight
n
equations
-
sin
0
cotan
'1z/2_ ¢z)J
-
n
0
+
cos
cos
0
cos
@ -
0
0
sin
_
-
0
L "
M -
N -
0
p-q-r-O
sin a(sin
+ Z
relationships
{cos
n;
Flight
ny
,,, sin -z
+
COS
X
0
cos28
(-p/_)
Uncoordinated
Kinematic
-
_
cos
Steady-state
1 sinZ_ z
cos
p = p t
Steady
2 -
?ny
sin I cos 8
sin -z
cotan2_z)
y
8)
+ sin
a[cosZB
- ny
C08
[_2z_'
870
-
sin2y
+
n
(2
sin
B sin
y,
A STEADY,
TABLE
3.- SMALL-PERTURBATION EQUATIONS FLIGHT (ACCELERATION x =
Xu -
- -
zu + .........
iI
Xw
r
....
qo
I0
" qo
Xq
r
-
Fx
+
(6u,
6w,
_
(A6 e,
6q,
60;
6v,
6p,
6¢,
TURNING
6r) T
Gu
I t
wo
.........
-8
cos
A6 c,
_6 a, a6p) T
I I
_o
_.........
, Zq + u o L .........
zw
_
OF MOTION OF AIRCRAFT FROM STEADY DERIVATIVES NEGLECTED)
xv
Xp
+ r o
, -g cos i .........
¢o
sin
%1
II
.......
I..... zv -
Zp -
Po
0
tI
T ......... t "g
v o
Xr
+ VO
I ....... sin
¢o
cos
%
t
zr
{..... I
I x.._z
mp mu
.
mw
mq
0
Iy
2po
+
mr
2re
(I x -r°
(I x
Iz) -Po
I
r i
F "' ..... Yu " .... ttU .... 0 .... n_
re
.... O
r l
l r
....
, _
' L
Yw + ....
J'
Po
.......... Yq
' L ......... +
I'
_'q
r ,
......... Sir ¢o tan
L
....
L
.........
I J
nl
tlPo
i -g sin ' ..............
¢o
c2r°
It
0
00
*.............. I _o sec 0 o
-
sin
t3Po
tlro
-
t -T O cos 0o i I ......................
r .......
0ol
Yv
' Yp + i .......
t'v
I'
_'P +
r --,
0
we
txqo " l
--
-
_. v
0
, , XSc
X6e --'1-
, #
-
z6 e f z6 c I --J--L-.J--I , m6c
m6e --
0
Xi
YI ;
"_"
T "
m6a
! , m6P
,
--
0
I
_-
Y6e
jI y6c
_
1 _ 0
' i
, ng e
!I
' J
T
,
I-
,
n6 c ,
i -
,0_ EOOR
;_ Y6p
_
L .
_ 0
' !
i
I"
n6 a
_ 0
,
, n6p_
u,
v,
w;
p,
q,
r;
6e,
6c'
_a'
_p
= TY I
I
xz Ni
IxI
z
-
I 2 XZ
Lt
+
LI
+
I
I
I I ni
I x
tl
m
•
I:z(l
z I
2 xz
I xz -
I
-I
X z
12 xz
+
I X Z
I
Ix -
-
12 XZ
I},)
I
x -
X z
12 xz
;
t_
-
I ,
nv r
"
0
k--
Y6 a
_1_ 0
-
Zl
! t£
0
_,r
ZSp
,
0
-L
Ni
m
z(z - _y)+ IX_ _ IxI
-
871
I xz 1
• I
I -I X _
ue
t2-oq
-, ........ , cos 0 0 tan
-
,
Mi :i
I! -
0
-_- ; z_ --_
Yi
"
' ........
where
xi
Yr , ........
I _
t3q o
O0
%
1--r--T'O
G m
-
z8 a
I t
ie
cos
-sin
, x8 ,
xsa
-r
¢o
L .........
_! P -
I w
, 8 cos I .........
r ....... _
L .......
!i
I z)
Y
0
I -- --I......
' ..............
.
q
I..... I 0
, ,
.... 0 nt w
i......... , 0
¢o
r , I ,
t'W
......... cos
I
Y .... 0
#
0
mv
z XZ
QUALi't_
tlq°
_o
PILOT-_STABILIT COMMAND / STATE__J VECTOR1
Y
AND CONTROL AUG
t
MAIN ROTOR FLAPPING DYNAMICS
RIGGING, AND CONTROL PHASING I1 GEARING,
TAIL ROTOR F LAPPING EQS. STATE VECTOR
WIND AND TURB.
H
H
AND MOMENTS FORCES
H
AND MOMENTS FORCES _DEG OF FREEDOM RIGID BODY EQNS. OF MOTION
HORIZ. STAB. FORCES
TIVE WIND RELA-
VECTOR STATE
VERT FIN FORCES
FUSELAGE FORCES AND MOMENTS
ROTOR
rpm
COMMAND
GOVERr_
/
ROTOR___ r_ _
Figure
_I
NOR
I.-
Block
diagram
showing
DYNAMICS ENGINE
principal model.
872
elements
I
of
single
ROT. DEG OF ROTOR FREEDOM
rotor
_1_
ROTOR rpm
helicopter
+_Xo 6ap_
_ap --[_
"p-f_ 6p,,_,_
,,. p-IN-" [O,.ECT,O._. _e
_. _ _ ) L,_'_C
j_CONTROL CYCL.C _.C'_CO_ TR OC CO. "2S. "O_
.o._,TOO,..,c_c.,cco.T.O.-""o :2o'_,c"_,_s "''COLLECTIVE
'°,-E_+
CONTROL
=
GEARING
.,oo,.o
_
_ep--__
CROSS-FEED FEED FORWARD
AIRCRAFT
E.x
,_XoXo
AND GAINS
Figure
II
2.-
FEEDBACK
Structure
GAINS
of
873
control
X = (u, w, o, 0, v, p, ¢, r) T
system
model.
LVDT'S
I
t
(2 PLCS) "_i
SERIES SERVOS
t
(PITCH(2 AND PLCS)ROLL)
SAFETY STICK
I
1
I
j_J
CONTROL STOPS
RESEARCH STICK FORCE ,' SENSOR
PITCH PARALLEL SERVO
ROLL DISCONNECT LINK
PITCH DISCONNECT LINK
ROLL SAFETY BUNGEE ROLL PARALLEL SERVO RESEARCH MAGNETIC BRAKE (PITCH)
Figure
3.-
UH-IH
PITCH AND ROLL ;ITION SENSORS
V/STOLAND
control
PITCH SAFETY BUNGEE
RESEARCH MAGNETIC BRAKE (ROLL)
(PITCH
system
BUNGEES AND ROLL)
longitudinal
874
and
lateral
cyclic
controls.
PILOT'S
INPUT
(S c AND Sp ONLY)
COMMANDEE MODEL
SERIES
SERVO
_CONTROL
CONTROL FOLLOWINGIINPUTS SYSTEM
v_ ±/
2 + 105.6S + 5685.01
J PARALLEL
Figure
4.-
+
POSITION RATE AND' F LIMITS
Simulated
SERVO
UH-IH
V/STOLAND
875
actuating
system.
TO BASE HELICOPTER
BASIC CONTROL SYSTEM
SWASH PLATE
co., .OO o.sT .
SAFETY-PI
LOT
FORCE
1
SUPERVISORY SYSTEM
r
ENGAGE DISENGAGE FLY-BY-WIRE CONTROL SYSTEM
I .I
] CONTROLS SIMULATION-PI
I
LOT
LIMITER
CONTROL FORCE SIMULATION
POTENTIOMETER
Figure
5.-
B0-I05
$3
876
control
system.
I
COMMANDED CONTROL
MODEL FOLLOWING CONTROL SYSTEM
TO BASE HELICOPTER
ACTUATORS 2526.6 INPUTS
_ I S2 + 95.5S + 2526,6
POSITION LIMITS RATE AND
._
=1
Figure
6.-
Simulated
B0-I05
$3
actuator
dynamics.
THROTTLE
(MAIN
AND TAIL
(ON/OFF) QE°
REQUIRED) ROTOR TORQUE
1 1 + Tts
' GOVERNORI
"1
G (s)
| ENGINE I KE
550 wf
! (a)
_C
QR
AW.
GOVERNOR G(rlS
+ 1)(rys
+ 1) ENGINEKE 1 + rES
rlS
i
(b)
Figure
7.-
RPM
governor.
(a)
877
Generic.
(b)
Simulated.
_o
PILOT INPUT
CONTROL
STANDARD ATMOSPHERE
CONTROL MIXING
SYSTEM MODULES
1
RIGID
AMBIENT CONDITIONS
SERVOS
,
BODY
POSITIONS, VELOCITIES, AND ACCELERATIONS
_,
FUEL CONTROL
l t,
MAIN ROTOR
TAIL ROTOR i
ENGINE
CLUTCH
•--_
GEARBOX |=m,
,
i
i
i
FUSELAGE
•-I"
i
VERTICAL TAIL
STABI LATOR i
SUM FC RCES AND
MOMENTS
I
EQUATIONS OF MOTION i
r
SENSORS
,]"
Figure
8.-
GenHel
simulation
878
elements.
4_
23
m
Q ud m2 u. ug kn-r 0
CH-53
v- 1 Q.
S-61 CH-46 0 THEORY CH-53 Figure
9.- Analytical
and flight
FLIGHT TEST
test gain limits ref. 60).
879
for pitch
rate feedback
(from
ANALYTICAL
PREDICTION
CH47B
FLIGHT
TEST RESULTS
Kp = ROLL RATE FEEDBACK GAI N, deg/deg/Nc
25
K¢ = ROLL GAIN,
ATTITUDE deg/deg
FEEDBACK
4 Kp = 0.7
0.3
K¢=0
2
_" = -o.o45
2O
= 8 rad/sec
15
_'= 0.5_ Kp = 0.2 K¢ = 1.0
_- = 0.05
"o
E
_o = 4.2 radlsec 10
Figure
I0.-
Comparison
of
calculated
and CH-47B limits.
88O
flight
test
results
concerning
galn
BUCS
_
_z__L 7_2/7_777/7 -/7/7// S-/7/7/7777/f_
E"n-_:
-3002co180 -400 10
.1
100
FR EQU ENCY, rad/sec
Figure
33.-
Identified
pitch
898
response,
9/6LO N.
FLIGHT DATA ..........
4O
1ST ORDER MODEL 4TH ORDER MODEL
"o
b =_ 20 N
, ,--%,,'T, ." ;':" " "_- .....
0
I
I
I
I
I
I
III
I
I
I
I
I
I
I1
1
I
150 -
..l.,j.,Oo
• -o
•
"o
b
,,,,
0"
...........
N ¢l
-150
I
I
I
I
I
.1
Figure
i
I I I
I
|
1.0 FREQUENCY,
34.- Transfer-function
models
f
I
I
1 I
f I
I
I
30
10 rad/sec
fit to flight-extracted CH-47B.
Bode plots
of the
42FLIGHT DATA rad/sec
0-
.............
1ST-ORDER
0.1 to
3.0
1ST-ORDER
0.1 to 20.0
4TH-ORDER
0.1 to 20.0
4_
m" z O
36-
o. ¢/) gJ m N34IB
......... 32 .... 3O 0
Figure
A .,
,,,,,
X_t.M
'rwv _vv,'w",,,v _,
35.-
_JVI=..6/
v', _,
"" v,"
1
I
i
i
!
I
I
I
i
!
2
4
6
8
10 TIME, sec
12
14
16
18
20
Comparison
of predicted
responses
899
of identified
models
with
flight
data.
