Ib Madsen, Bob Oliver, Andrew Ranicki, Carl Riehm, and Richard. Swan for conversations which ...... groups, Tata Institute (1969). M-A. Knus and A. 0janguren, ...
An Introduction to Maps Between Surgery Obstruction Grouos by Ian Hambleton*,
Laurence Taylor**,
and Bruce Williams**
In order to apply surgery theory we need methods
for
determining whether a given surgery obstruction (f : N ÷ M,f)
~ Ln(~G,e)
is trivial.
Notice. that it is
more important to have invariants which detect L-groups than to be able to compute the L-group themselves. One approach is to use numerical invariants Arf invariant3, [M1], maps.
[Da],
multisignatures,
[H-Mad],
[P].
such as
or the new "semi-invariants"
Another approach is to use transfer
For example, (i)
Dress
[D] has shown that when
group,
Ln(~G)
G
is a finite
is detected under the transfer
by using all subgroups of
G
which are hyper-
elementary. (ii)
Wall G
[W9] has shown that when
is finite, then image
is detected by
Ln(~G2,~),
2-Sylow subgroup of
*Supported by NSERC **Supported by NSF
G.
M
is closed and
(~ : [M,G/TOP] + Ln(~G,e)) where
G2
is the
5O
(iii)
If
G
is a f i n i t e
detected
under
subquotients nionc,
The (when
goal
G
surgery
theory.
finite
as w e l l
assume
Suppose G.
T h e n we
that
H
JR1],§2),
"push
and the
...
is an i n d e x
... ÷ L n ( m H , m ) (see
such
transfer
from
procedure maps
codimension
subgroup
that
1
of a
of s u b g r o u p s
Hi
,e - 1.
is an i n d e x Thus
we m i g h t
2 subgroup.
exact
fl L n ( ~ G , ~
[T-W]).
transfer
a sequence
2 subgroup
forward"
quater-
a systematic
is any
exists
by u s i n g
(see
computing
H
i = 0,
is an i n d e x
get t h e
if
is
dihedral,
cyclic
arising
c He = G
foz
H
maps
that
Hi+ 1
are
and
for
L~(~G)
and p r o j e c t i o n
which
then there
H = H 0 c H 1 c H 2 c ...
then
is to give
transfer
G,
of
G
2-group)
Recall
2-group
2 subgroup
of
paper
is a f i n i t e "twisted"
transfer
seml-dihedral,
o f this
and the
2-group,
of an a r b i t r a r y sequence
) ÷ L n ( f !) ~
exact
group
...
sequence
!
... ÷ L n ( ~ G , m ) (see
JR1],
One of We t.
...
§7.6).
can v i e w
R = ~H. let
f~ n n ( ~ H , ~ ) + Ln(f! ) +
More
a = t 2 e H,
S = ~G
as a t w i s t e d
precisely, and we
suppose let
p
we
quadratic choose
: R ÷ R
be
extension
t e G - H. conjugation
Then, S = R [v'~] P
where
t
tx = p(x)t
is v i e w e d for all
= R
[t]/(t
2 -
as an i n d e t e r m i n a t e x E R.
a),
P
over
R
such
that
by
51
Let
y
d e n o t e the G a l o i s
automorphism
of
S
over
R
g i v e n by y
W e w a n t to e x t e n d the and
[M-H]
(x,y
: S ÷ S; x + yt ÷ x - yt
appendix
classical
2 where
results
f : R + S
c R).
in [L] chap.
is a q u a d r a t i c
7
extension
of fields.
R e c a l l that W a l l ring with u
[W2] d e f i n e d g r o u p s
anti-structure, a2(r)
is a unit,
For example,
i.e.
~
= u r u -I
Ln(ZZG,m)
Ln(R,~,u)
for any
is an a n t i - a u t o m o r p h i s m ,
for all
r e R,
= Ln(~G,a~,l) ,
and
where
~(Z
~(u) ngg)
= u -I :
Z n g ~ ( g l g -I.
S u p p o s e w e h a v e a m a p of rings w i t h a n t i - s t r u c t u r e f : (R,~0,u) where
S
is a t w i s t e d
Galois
automorphism
y-conjugate
where
quatratic
y.
This y i e l d s
~ ~
(~,u)
Y ~ ( s ) / a -!
~0
to get
(~,u)
s c S
= (~,~),
and
~ = ¢-a y ~ ( / ~ - l ) u .
a map
is the r e s t r i c t i o n
If w e t w i s t and we get
with
(S,y~,u).
for all
: (R,~n,~) where
Rp[~]
T h e n we also h a v e the f o l l o w i n g
: (R,~0,u) +
we can " t w i s t "
~(s)
extension
map
Yf Moreover,
~ (S,~,u)
a map
(ya,u)
÷ of
(S,~,~), ~.
we get that
(y~,u)
= (y~, - ~),
52 N
¥f
:
(R,a 0,
-
~)
+
(S,¥a,
-
~).
Then we get the following amazing isomorphisms. P! : Ln_l(f !) T Ln(f !)
F., : Ln-i (Yr.') ~÷ Ln(Yfx )
r"' : Ln( f! ) ± Ln+l( ~! )
r "' : Ln(Y f' ) _ + L n+l(Yf ' ")
!
The maps
F!
and
F"
are defined using an algebraic
version of integration along the fibre for line bundles. the case of group rings the isomorphism
F!
[WI] chap. 12.C, [C-SI] and explicit in [H].
In
is implicit in The general case
is due to Ranicki (after some prodding by us). (See [RI], §7.6 and the appendix by Ranicki in [H-T-W]). !
By combining
F!
for
f,
F"
for
~f,
and
scaling
isomorphisms : Ln(S,~,u) ~ Ln(S,y~ ~ - ~] = Ln(S,y~,,u)
(see 2.5.5)
Ranicki constructed the following comuutative braid of exact sequences
5S
(0.i)
Twisting Diagram for
f : (R,~o,U) + (S,m,u)
Yf! Ln(S,a,a) = Ln(S,y~,u)
f! L (S,~,u) n = Ln(S,Y~,-~)
Ln(R,a0,u)
/\
(R,ao,a) Ln-2 = Ln(R,~0,-u)
/\
Ln+l(f ! )
/--,, Ln+l(S,a,u)
~f!
/
Ln+l (Yf")
\
Ln_l(R,50,u)
=
=
Ln+l(S,Y~,-~)
Ln+l(R,50,-~)
Thus the problem of computing
/
/
Ln(f ! )
L n I(S,~, ~) = Ln_l(S,y~,u)
f!
and
Yf!
Ln_I(R,~o,U)
is intimately
related to the problem of computing the "twisted" maps and
f!
~f!.
Examples: I.
Suppose
semi-simple rings.
p L n = L n'
n
is even, plus
R
and
S
are
Recall that
simple rings (see [R2]).
Lp is trivial for semiodd Thus, all of the groups along the
bottom of (0.I) are trivial and the groups along the top form the following exact octagon (see also [War] and [Le]).
54
(0.2)
Semi-simple
8-Fold Way
f, ~ Ln(S,~,u)
Yf! q J - a / L n ( R , ~ 0 , u ) Ln(S,~,~)
Ln(R,aO,-~)
Ln(R,~0,u)
Ln(S,a,-~)
y!"-'-" f W'a~
(a)
f, Ln(S,~,-u) ~i
then
yf!o/~ Ln(R,~0,-u)
Suppose we have f : (F,id,l)
where
~f.1 q ~
F ÷ K
+
(K,id,l)
is a quadratic extension of fields.
Ln(F,id,-l)
~ Ln(K,id,-l)
m (0);
If
n = 0,
and we get the
following exact sequence (0.3)
0 + L0(K,y
) + L0(F ) ÷ L0(K ) + L0(F ) ÷ L0(K,y
) + 0
which extends the exact sequences of Lam [L], chap. 7 and Milnor-Husemoller (b)
[M-H], appendix 2.
Suppose we have f
where
D
: (K,id,l)
is a quaternionic
maximal subfield of involution of type
D. O.
L0(D;S p) = L0(D,~,-I) ,
÷
(D,~,l)
division algebra and
Since
~IK = id, ~
If we let and
K
must be an
L0(D;O) = L0(D,~,I) ,
L0(K,p) = L0(K,~00~I) ,
get the following exact sequence
is a
then we
55
(0.4)
0 ÷ L0(D;S p) ÷ L0(K,p)
÷ L0(D;O)
÷ L0(K ) ÷ L0(D;O ) +
L0(K,P) + L0(D;S p) + 0 (c) K
Suppose
D
be a quadratic
a division
extension
ring.
we get another
is a division
(trivial
d
such that
(anti)
D@FK
involution
F.
Let
is still ~0
on
D,
example
extension)
Suppose we have
÷ (R x R, a 0 x ~0,u x u)
is the diagonal
and (0.2) breaks
÷ (D®FK,~0@Id,1)
quadratic
(d : (R,~0,u) where
F
Then for any
(D,~0,1)
(d)
of
ring with center
map.
into the short
Then
Ln(S,~,+u)
exact
sequences
is trivial of the form
d v
1 ÷ Ln(R,~0,u )
2. 12C,
; Ln(R,e0,u)
Codimension
[C-S1],
[C-$2],
x Ln(R,a0,u)
1 Sursery
(see
÷ Ln(R,a0,u)
[B-L],
[H], and [RI] Chap.
[Me],
+ 1
[Wl] Chap.
7)
Suppose we have f : (~H,am,l) where
H
is an index 2 subgroup
is a closed manifold a connected map
+ (~G,am,I)
with
submanifo!d
~ : G + G/H = {+i}.
of
G.
Also,
(~iX,el X) = (G,e).
such that
~I(~(Y + X))
Then by combining
suppose Let
Xn
yn-i
be
induces
the
results
of Wall
56 [wi],
chap.
12C,
Cappell-Shaneson
we get the following
commutative
[C-SI],
and Hambleton
[H],
diagram with exact rows
Ln(?ZH,~)
[ fI
a, ... ÷ S(X)
'+ Ln(?ZG,~)
, [X,G/TOP]
!a t
[Y,G/TOP]
p.*
Ln_I(ZZG,~)
' Ln_I(Z~G,~
Ln_l( ?Z'H,~oj, 1 )
where
t E G - H
Assume an element f
and
L
~i Y ~ Wl X in
S(X),
is homotopic
n
,1)
then
> Ln_l(f !)
n ~ 5. 8,(f)
fl
If
~ Ln_2(?Z.H,~m,~)
[C-SI],
f : M + X
is trivial
such that
are simple homotopy
Cappell-Shaneson
Ln(ZZH,a~,-I)
= Ls n
and
to a map
f[l(x - Y) ÷ X - Y
observed
Ln(f ! )
[C-$2]
represents
if and only if
f~l(y)
+ y
and
equivalences.
and Hambleton
[H] have
that since
image(a,
Yf!at(x) element
: [M,G/TOP]
÷ Ln(~G,~))
can b e v i e w e d as t h e p r i m a r y x ~ Ln(~G,m)
arising
c ker(Yf!a t)
obstruction
from surgery
t o an
on closed
manifolds.
In this
p a p e r we c o m p u t e t h e t w i s t i n g f : (?Z.H,a~,I)
÷
(ZZG,a~,I),
diagram
(O.1) where
57
G
is a finite 2-group,
and
Ln = Lp . n
Our motivation is
that we have used these results to compute L~(~G,m)
(see [H],
~
: [M,G/TOP] +
IT-W], and [H-T-W]).
Roughly speaking, we proceed as follows (i)
We show that the Twisting Diagram (0.1) for decomposes
into a sum of diagrams
irreducible @-representations (ii)
of
f
indexed by the G.
We use quadratic Morita theory to construct
an
isomorphism between each component diagram and the twisting diagrams associated to integral versions of Examples
1. (a),(b),(c),(d)
i.e.
maximal orders in division rings. (iii)
By using classical results on quadratic forms over division rings and localization sequences we are able to finish the calculation.
In Part I we carry out this program for the groups along the top and bottom of the twisting diagram (0.1).
In Part II
we compute the actual diagrams. This paper is a preliminary version of [H-T-W] where we give details, in addition to
compute the twisting diagrams L~,
for other L-groups
and give geometric applications.
We thank Tony Bak, Bill Dwyer, Ib Madsen, Bob Oliver,
Chuck Giffen, Karl Kronstein,
Andrew Ranicki,
Carl Riehm, and Richard
Swan for conversations which helped to clarify our thinking.
58
PART !:
Computation of the LP-grouDs
Let
G
be a finite 2-group and
H an index 2 subgroup.
In the o r i e n t e d case, the groups
[B-K],
have b e e n
computed by B a k - K o l s t e r
[KI],
Carlson-Milgram
These results are nicely s u m m a r i z e d
[C-M].
[K2],
LP(Z~G)
Pardon
[P], and
by T h e o r e m A in [H-M] where they give a d e c o m p o s i t i o n of LP(zzG)
indexed by the i r r e d u c i b l e ~ - r e p r e s e n t a t i o n of
G.
Besides e x t e n d i n g their computations to the u n o r i e n t e d L-groups, LnP(Z~G,m)
and the c o d i m e n s i o n i surgery groups
we also have to overcome the following problem.
LP(~G,~,I), All of the
above computations were b a s e d upon c h o o s i n g a m a x i m a l i n v o l u t i o n invariant order,
MG
w h i c h contains
Z~G.
Unfortunately,
it
is not always true that
M G n ~H
invariant order in
(Bruce Magurn has o b s e r v e d that this
~H.
can h a p p e n even w h e n
G
is a m a x i m a l i n v o l u t i o n
is the dihedral group of order 8).
Thus it is not clear that the above computations
and decom-
positions are functorial and we have had to m o d i f y t h e i r m e t h o d somewhat.
We have a t t e m p t e d to keep Part I fairly
self-contained,
but we w o u l d like to emphasize that Part I
is b a s e d upon the w o r k of the above authors and Wall's damental sequence of papers
[WI] - [W8].
we try to clarify certain questions
In Section
fun-
(2.5)
i n v o l v i n g quadratic
Morita theory.
§I.
(i.i)
Basic D e f i n i t i o n s
and O v e r v i e w
I n t e r m e d i a t e L-sroup The use of arithmetic
squares
forces us to use L-groups
5g
other than
Lp . n
relationships
Thus we shall start by r e c a l l i n g
b e t w e e n the various
A ring with antistructure R,
an a n t i - a u t o m o r p h i s m
that
a2(a)
--uau -I
L-groups.
(R,a,u)
~ : R ÷ R
for all
For any right R-module
M,
the
and a unit
a E R, D~(M)
is an a s s o c i a t i v e u E R
and such that
= HomR(M,R)
ring
such
~(u) -- u-1
is the right
R-module where (f • r)(m)
-- a(r)
• f(m)
where
Since inner automorphisms
act trivially
Ki(R)
and
induces
involutions
Ki(R))
which we also denote by
If then
Y
on
is an ~-invariant
L~(R,~,u)
f ~ DaM, m c M,
and
on K-theory,
r E R. D~
Ki(R) -- coker(Ki(Tz,)
÷
~.
subgroup
of
Ki(R),
denotes the standard L-group
i=0
or i,
defined in [Ca],
[R3] §9, and [RI] p. 688.
If
R = ~G
and
~
the following geometric
: Z n g + Z ng~(g)g -I, g L-~roups,
Ls(?ZG,~)
{w ab } cK 1 -- L n (Z~G,a~,I)
(see
[Wl])
L~(~G,~)
= Ln (~G,a~,l)
(see
[Sh])
LP(~G'~)n
= L~0(~G'~
(see [Ma],
If
Y2 c YI c Ki(R),
subgroups, sequence
'I)
i = 0 or i
then we get the following (see
[R3] 9.1)
then we get
[P-R])
are both ~-invariant Rothenberg
exact
Y2 Y1 ... ÷ L n (R,~,u) ÷ L n (R,~,u) ÷ H~(YI/Y 2) ÷ ...
(i.i.I)
where
H~(YI/Y 2)
is the Tate cohomology group
associated to the action of
~/2
on
YI/Y2
Hn(~/2,YI/Y 2) via
m.
Also,
KI(R) (1.1.2)
Ln
If
Y = K0'
Oc~0(R)
(R,~,u) = L n
(R,~,u)
then
(1.1.3)
L~(~ 1 × R~,~ 1 x ~2,Ul × u 2) : L~(al,~l,Ul>
× L~(R2,~2,u2), '
and (1.1.4)
L~(RI,al,Ul) : L~(R2,a2,U 2) and
(R2,a2,u2)
whenever
(Rl,~l,Ul)
are quadratic Morita equivalent
(see Section 2 for definition)
Since
KI(RI × R2) # Ki(RI) × Ki(R2)
and since
Ki
not a Morita invarlant,
(1.3) and (1.4) are false for most
Y : e.g.
This problem is overcome by intro-
Y = 0 c K0
ducing the following variant L-groups. If
X
is an ~-invariant subgroup of
get L-groups, for any If
(1.1.5)
L~(R,a,u).
(See [W3] for
i ~ 0). ImageK0(ZZ) c X c K0(R),
then
ff~(R,~,u) = L~(R,~,u),
Ki(R) , i = 1
then we and [B-W]
is
61
where
X = image
If
of
X
in
K0 (R)"
imageKl(?Z ) c X ~ KI(R) ,
then we get an exact
sequence (1.1.6) where
... ÷ LXn(R,~,u) ÷ LnX(R ~,u) + Hn(imageK0(2Z)) + X = image
of
X
in
.
KI(R).
Again we get Rothenberg sequences as in (I.i.i), and Ki(R ) O=Ki_I(R) Ln (R,~,u) = L n (R,a,u).
(1.1.7)
Furthermore,
(1.1.8)
~
Y2
YI×Y2 Ln (R I x R2,a I x ~2,Ul x u 2) m L I(R!,~I,U I) x L n (R2,~2,u 2) and (1.1.9)
L~(RI'aI'Ul) ~ L¢(Y)(R2'm2'U2)n and
(R2,~2,u 2)
whenever
(R l,al,ul)
are quadratic Morita equivalent.
(@ : Ki(R I) ~ Ki(R 2)
is the isomorphism induced by
the Morita equivalence) (I.i. I0)
Convention:
L l(R,a,u) ~ L
OcK0
Henceforth
will denote
(R,~,u).
Our first goal is to compute finite 2-group and
Ln(R,m,u)
(~,u)
L~(~G,~,u)
for
any anti-structure.
First consider the following long exact sequence
G
any
62
(i.l.ll)
....
~,~(~,~,~,)
(1.2)
~ ~(~2~,~,,u)
Computation of
(1.2.1)
Theorem:
structure
(a,u)
~ ~ ( ~ . ~ ~. ~2~,:,,:,)....
LnP(~2G, m,U)
For any finite 2-group and any antion
~ 2 G,
we get ~/2
p
Ln(ZZ2G,e,u)
~+ LnP(ZZ/2,id,l)
=
0
if
n e 0(2)
if
n e 1(2)
Theorem 1.2.1 follows from the following two results. (1.2.2)
Reduction Theorem:
If
R
is a complete local ring
then for any 2-sided ideal I, (i)
K0(R) ~ K0(R/I) ,
(ii)
Proof: (1.2.3)
LP(R'~'U)n +- L~(R/I,~,u),
(assuming
~(I) = I)
See [W5], [B]. Lemma:
ker (~/p)G Proof:
and
+ ~/p
If
G
is a finite p-group, then
is nilpotent.
See [SE], p. 57.
Notice (1.2.3) implies that kernel
(~pG
+ (~/p)G
÷ ~/p)
is complete.
(1.3)
Computation..of
LP(ZZGn . + ~2G~a~u).
It is well known that QG = ~A¢,
(see [Sl] or [Y])
where the product is taken over the set of isomorphism classes of irreducible Q-representatlons.
Each
A¢
is a simple ring,
83 and
A¢ = a¢~G
for some central idempotent
be expresses as a sum of nontrivial Since or
~
where
~(¢)
a¢ ~ ~ [ ½ ] G
~[½]-maximal
is another
a(m¢)
is either
irreducible
(.see [Y], p. 4) and
order in
A@
which can not
central idempotents.
is an inner automorphism
a (¢)
In fact a
2
a¢
aS
~-representation.
A¢ = a¢(~[½]G)
(.see [Re], p. 379).
is
Resi~Ic --
tion gives a decomposition of rings with antl-structure. (1.3.1)
(~[%]G,a,u)
¢=~(¢)~(A¢,~¢,u¢) The A¢ x Ae(¢)
=
x ¢=~C¢)~ (~¢ xA (¢),~¢x~C¢),u ~ x u (¢)) . are called type GL factors and make no
contribution to any Wall group.
We prove the following result in Section 2. (.1.3.2)
Decomoosition Theorem:
and any anti-structure
on
~G ,
For any finite 2-group
G
we get the following
canonical isomorphlsms. L~(~G
÷ ~2G,m,u)
T Ln(~[½]G
÷
~2G,m,u) ^
-9"
¢
Ln(A ~ + A¢(2),m~,u¢)
¢=~(¢) (Recall that
Ln
denotes
Consider the following a primitive
K1 OcK0) Ln t L n ~[½]-algebras,
where
~j
is
2J-th root of 1 and - denates complex conjugation.
64
(1.3.3) i)
rN
2)
RN = ~ [ } ] [ ~ N + 2
+ ~N+2 ]
3)
FN = ~[½][~N+2
- ~N+2 ]
4)
HN = ( ~ )
~[½][~N+I ]
=
( ~ )
® RN_2,
= {~
+
~i
Remark:
Each of these
of rank
2N .
where
+ ~j
+ ~k
I ij = -ji = k, i 2= j2 = -I}
~ [ ~i] - a l g e b r
a
s
is a free
~[½]-module
Now, consider the following anti-structures.
(1.3.4) l)
(!d,l), (-,I), (T,I), (F,I)
On
rN,
Id
is the identity;
T(~N+I) = - ~N+I field of
T; ~
-
or, equivalently, has fixed field
2)
On
R N, (id,l),
3)
On
F N, (Id,l), (-,I)
4)
On
HN,
(~i,I),
is complex conjugation; FN_ 1
is the fixed
FN_ 1 .
(T,I)
(4,1)
where
~l(i) = ~(i) = i ~l(j) = ~(j) = j
^
and
alIRN_2 -- !d, ~IRN_ 2 = T.
In Section 2 we also prove the following result.
65
(1.3.5) and
Identification Theorem:
(~,u)
If
G
is any anti-structure on
irreducible ~-representation
~
is a finite 2-group,
ZZG ;
with
then for any
m(¢) = ¢,
^
we get that
^
Ln(A ~ + A¢(2),~¢,u ¢) ~ Ln(A ¢ + A¢(2),B¢,v ¢)
where
A¢ = a¢2Z[I]G
and
(A¢,B¢,+_v#)
with anti-structure in list (1.3.4).
is one of the rings Recall that
Ln(A¢,B~,v ¢) ~ Ln+2(A¢,~,-v¢).
In Section 3 we compute Ln(A ÷ A(2),~,v) rings with anti-structure in List (1.3.4)
for all of the
and tabulate the
results in Table I. Theoretically we could then calculate L P ( ~ G , a , u ) but we n restrict the antl-structure slightly at the start of Appendix I in order to easily identify (A¢,S¢,v¢) on List (1.3.4) Appendix I, part I).
(see
In part 2 we settle the remaining questions
involved in using l.l.ll.
§2.
Proofs of the Decomposition Theorem (1.3.2) and of the Identification Theorem (1.3.5)
(2.1)
Excision in Arithmetlc Squares Suppose
Then
S-IA
= lim A/sA s~S
S
is a multiplicative subset of a ring
is the localization of
R
away from
is the S-adic completion of
A-
1
A,
~
l
S-IA ÷ S-I~ is the arithmetic square associated to
(A,S).
and
S,
A.
66
(2.1.2)
K-theory Excision Theorem:
For any integer
i,
Ki(A + A) ~ Ki(S-IA + S-I~)
(2.1.3)
Corollary:
integer
i, Ki(~G
For any finite 2-group
G
and any
÷ ~2 G) ~ K i ( ~ [ ½ ] G + ~ 2 G) ~
Ei(A ¢ ~ A¢(2))
¢
irred. Q-rep. (same notation as in (1.3)) (2.1.4)
L-theory Excision Theorgm:
(See [RI].
Also [B],
[B-W], [C-M], [p], and [W7].) We assume that structure
(a,u)
A
in (2.1.1) is equipped with an anti-
such that
SIS
is the identity.
Localization
and completion then induce anti-structures on the other rings in (2.1.1).
Let
X c Ki(S-IA)
and
Y c K.(A)
be ~-invariant
1
subgroups. and let
Let
C = kernel of Ki(A) ÷ Ki(S-IA)/X @ Ki(~)/y '
I = image of X @ Y ÷ Ki(S-IA) @ Ki(~ ) + Ki(S-I~).
Then, LC+Y(A + A) ÷ LX+I(s-IA ÷ S-I~) n
(2.1.5) structure
n
Corollary: (a,u)
CI(G) Ln (~G
on
"
For any finite 2-group ~G~
+ ~2G,~,u)
letting
X
and
Ki+l 1 ~ Ln (~[~]G
¢
a(¢)=¢
G
and any anti-
Y
be trivial we get
÷ ~2G,~,u)
LKi+I(A + ^ n ¢ A¢(2)'~¢'u¢)
67
where
CI(G) =
ker K I ( ~ G )
rest of the notation
÷ Ki(m[½]G)
@ Ki($2G )
and the
is the same as in (1.3).
c.(G) If
i = l,
then the
which were computed by Wall Notice that
(2.2)
then
LC0 (G) n (~G
^ + ~ 2 G)
(2.1.5) would imply the D e c o m p o s i t i o n
(1.3.2).
Representation
Definition: noncyclic, (2.2.1)
are the Ln-groups
[W8].
if we can show that
LPn(ZZG ÷ ~ 2 G ) , Theorem
!
regroups
Lnl
Theory
for Finite 2-~roups
A finite 2-group normal
w
is special
if it has no
abelian subgroups.
Proposition:
A group
n
is special
if and only if
it is one of the following groups (5)
(ii)
cyclic,
C N =
dihedral,
D N = , N > 3 2 N-I
(iii)
semi-dihedral,
x
2 N-2 1 - >, N >
SD N = 3. Each special group representation
w
has a unique
¢(~).
For any irreducible p : G ÷ GL(Vp),
faithful, irreducible,
we let
@-representation
of a group
G
~-
=
68 Dp = End@G(Vp). Schur's lemma implies that
(2.2.2)
Theorem:
N
(i)
G,
H
¢
on
with normal
is special
up to
Proof:
there exists a subgroup
If we pull
(iii)
is a division ring.
such that H/N
(ii)
P
For any irreducible @-representation
a finite 2-group subgroup
D
@(H/N)
G,
De m D$,
we get where
back to
H
and then induce
¢. @ = @(H/N).
(See [F])
(2.2.3)
Table D@(~)
IT
CN
FN_ I @ Q
DN
RN_ 3 ® Q
SD N
FN_ 3 ® Q
QN
HN_ 1 ® Q
Thus the rings from list (1.3.3) are in the division rings
D@(w)
~[½]-maximal
orders
Notice that the centers of
these division rings are precisely the fields which are subfields of
~(~j)
for some
Q(~i )' ~(~i + ~i )' primitive (2.2.4) for some
and
j,
namely fields of the form
~(~i - ~i )"
(Recall
~j
is a
2J-th root of 1.) Weber's Theorem: j.
Let
0
Suppose
K
is a subfield of
@(~j)
be the ring of algebraic integers in
69
K,
and let (i)
R = 0[I]. K/Q
Then
is unraraified over all odd primes.
it is totally prime (ii)
d
ramified,
and the unique
Over
2,
dyadic
is principal.
The ideal class
group
F(K) ~_ K0(0)
= K0(R)
has
odd order (iii)
The narrow
ideal
class
group
(x))
F (K) ~ (group of ideals) --/principal ideals ~ s u c h that x > 0 \ f o r all real places also has odd order Proof: theory
For (ii), implies
that
have odd order; is unramified
see Theorem if
then
K = @(~i + [i )' K
(2.2.5)
K = ~(~i )
Corollary:
implies
For any
K0(H N)
have odd order.
Proof:
Notice
where
if
i.
Since
HN
H N ® ~, (36.3)
for
or
does not E/K
which
E®K@(~ i)
of
Q(~i ).
K0(~),
FN ,
K0(FN),
then
in a subfield
is a maximal
field
Thus
K = ~(~i + ~i )"
N, K0(FN)~
rings
then
extension
(iii)
F*(K)
entension
But,
R = FN, RN,
0 = ring of algebraic
for some algebra
that
quadratic
Class
and
has a quadratic
at all finite primes.
would be an unramified, (il) for
10.4 in [Was].
of
and
R = 0[ 1 ] ~(~i)
order in the division
in [Re] implies
that
K0(HN) : r~(~(~ N + IN)).
70
(2.3)
(Linear)
- Morita
Theory:
(see
[Bass
I] and
[Re]
rings
A
for
details).
Definition: B
A Morita
is a 4 - t u p l e
BMA
and
bimodule
equivalence
(M,N,u,r)
ANB;
u
isomorphisms T(n
between
where
M
: M@AN ÷ B such
® m)
and
and
T
two N
and
are b i m o d u l e s
: N®BM + A
are
that
• n' = n
• u ( m @ n'),
• m'
• r(n
and u ( m ~ n)
= m
@ m')
for all all
F o r any r i n g
A,
we
let
finitely
generated
projective
(2.3.1)
Theorem:
Assume
between
A
and
B.
PA
we get
the
e N,
and
e M.
category
of
R-modules.
(M,N,u,T)
Then,
m, m'
denote
right
n, n'
is a M o r i t a
an e q u i v a l e n c e
equivalence of c a t e g o r i e s
@A N PA ~" ~ PB
®BM and an i s o m o r p h i s m
K.(A) ~
~.(B).
l
Furthermore, of
1
center(A)
= B - A - bimodule
endomorphisms
M = center(B).
Examples
(2.3.2)
Derived
Suppose
of
Mn
M
for some
Morita
c 0b
equivalence
(F A)
n > 0,
and
i.e.
A
M
is a d i r e c t
summand
is a p r o ~ e n e r a t o r .
Then
71 A
and
B = EndA(M)
HomA(M,A),u,~)
where
the evaluation If
of the simple
G,
then we let
(V ¢)
A¢c
R
if there
M
such that
If
A
@G.
R-algebra,
fractions
Then, whenever
K.
R
is also a R-maximal
is Azumaya
prime
ideals Suppose
of a finite Azumaya
Definition: of Morita
representation
of
where
Furthermore,
A
A
and a progenerator
A
is central
[K-O].)
i.e.
domain with field of
is an Azumaya A®RK.
(See
R-algebra,
Conversely,
K-algebra
A
with
Ap ~ Mn(K p)
if
A
center
is R,
for all finite
[Rog].)
¢ : G ÷ GL(V¢) group of order
and the division
as R-algebras.
then
order in
(See
A¢
then a R-algebra
B
if and only if
R.
Re-algebra
i of Prop.
becomes
in
ring,
is a Dedekind
order in a simple
A
Thus
A@RB ~ EndR(M)
Assume
then
is
denote the simple module
is a R-algebra
is an Azumaya
a R-maximal
and
Z ;Ki(D¢)-
center A = R.
A
T
equivalent.
is a commutative
is Azumaya PR
V¢
are Morita
Ki(~G)
of
(M,N =
• m' = m • n(m')
is a @-irreducible
component
D# = EndA
If
via
map.
group
(.2.3.3)
equivalent
u(m @ n)
¢ : G + GLn(Q)
a finite
ring
are Morita
is a irreducible m.
Then
~-representation
A~ = a¢ • ~ [ ~ ] G
Re = center(A¢).
(See
is an
[F], Corollaire
8.1.) For any commutative equivalence
an abelian
classes
ring
R,
Br(R)
is the set
of Azumaya R-algebras.
group under tensor product
over
It R.
72 Suppose
R
is a Dedekind
a finite
extension
of
(.2.3.4)
Theorem:
Let
orders
Q
or
~p
equivalent
for some prime
Aj c Aj
in simple K-algebras
are Morita
domain with quotient
for
j = 1,2
Aj, j = 1,2.
if and only if
K
p.
be R-maximal
Then
AI
field
and
AI A2
and
A2
are Morita
equivalent. Proof:
See [Re], Theorem
(2.3.5)
Corollary:
(2.3.6)
Theorem:
Then,
(21.6).
The map Suppose
Br(R)
+ Br(K)
is a momomorphism.
that G is a finite
for any i, Ki( ~ G ÷ ~ 2 G ) ÷ ~ Ki(A ¢ + ~¢(2)
¢
where
¢
runs over the irreducible
G and A¢
First
(2.3.4)
after consulting
and Table
apply
corollary
paragraph
Theorem
K0(~G)
is a finite group.
(Swan):
(2.3.6), becomes
Rothenberg
representations
of
The result
two of (2.3.2);
follows (2.2.2)
from (iil);
2.2.3.
(2.4.1)
Then
)
(1.3.3).
(2.1.3).
Proof of the Decomposition
K0(~G)
rational
is one of the rings on list
Proof:
(2.4)
2-group.
If
(2.2.5),
G
argument
(1.3.2)
is a finite
and (1.2.2
an isomorphism
sequence
Theorem
group,
then
(i)) imply that
when we localize
then implies
that
at 2.
C0(~G) A
÷
73
c0(~G) Ln Thus
(1.3.2)
(2.5)
(~G
~ ~ 2 G) ÷
is a special
Quadratic
Definition:
(A,m,u)
(M,N,~,T)
where we make
N
~2G)
(Compare with
A quadratic. Morita
equivalence
+
equivalence
and
B-A
(B,~,v)
bimodule
[F-Mc]
and [F-W])
between
two rings
is given by a Morita
plus a B-A-bimodule
into a
.
case of (2.1.5).
Morita Theory
with antl-structure
L~(~G
isomorphism
using
a
h
and
S.
: M ÷ N We
also require that mT(h(mlU)
® m 2) = T(h(m 2) @ mlv) for all
(2.5.1) and
Theorem:
(B,B,v)
A quadratic
induces
Morita
equivalence
ml,m 2 ~ M
between
(A,e,u)
isomorphisms
: Ki(A) Z Ki(B),
(equivariant with respect to ~, and B,)
H~(Ki(A))
@ H~(Ki(B)),
L~(A,a,u)
+ L¢(X)(B,B,v) n
and where
X
is any
~,-invariant subgroup
(2.5.2)
Derive~
(A,~,u)
is a ring with anti-structure
(,linear)
Morita
center B.
e
Mor~ta Equivalence
equivalence
Assume
where we use (i)
Quadratic
h
: M ÷ N
to make
B
admits
h
becomes
B
to make
between
N
a unique
A
(M,N,u,T)
and
is a right
B.
Let
A-module
into a right
isomorphism
a left S-module.
B
Ki(A).
Suppose is a R = center A =
isomorphism,
A-module.
anti-automorphism
a B-A-bimodule N
and
Theorem:
of
Then, such that
when we use
(BIR = siR);
and
74
(ii)
there exists (M,N,~,~,h) between
(2.5.3)
is a quadratic
(A,a,u)
Corollary:
structure where
a unique unit
Suppose
A
(D,B,v) Proof:
Then
A-modules,
(.2.5.4) ~G
(A,a,u)
V
w
is a ring with anti-
D = the division
and
algebra
(~,u)
G. ~
to
are both simple right
a right A-module
Suppose
Let
(B,v).
V a = HomA(V,A)
there exists
Corollary:
K.
is quadratic Morita equivalent
Ln(~G,~,u)
and
(A,~,u)
and let
for some finite group
(2.5.5)
Morita equivalence
(B,B,v).
for some anti-structure Since
such that
is a simple algebra over a field
V = simple right A-module EndA(V).
and
v E B
isomorphism
h
is an anti-structure
: V ÷ V ~.
on
Then, ~¢
Ln(D¢,~,v~).
Definition:
If
(R,a,u)
is a ring with anti-structure
is a unit in
R,
then the scaling of
(a,u)
by
w
is the new anti-structure (a,u) w =
where
B(r) = wa(r)w -I For any R-module
for all M,
(~,v)
r c R,
there exists
DaM + DBM;
f ÷ (fw
and
v = w~(w-l)u.
an isomorphism
: x ÷ wf(x)).
Thus we get an isomorphism ow
Alternatively,
: Ln(R,m,u) ÷ Ln(R,(m,u)W )
~w
can be gotten by applying
(2.5.2) with
75 MR = R
(2.5.6)
and
h : R + HomR(R,R)
Definition:
= R
Suppose
sends
is a commutative
involution
~0"
equivalence
classes of rings with anti-structure
A
Then
R
the map that
Br(R~0~
r
air = s 0
rw -I.
ring with
is the set of quadratic
is a Azumaya R-algebra and
to
Morita
(A,e,u),
Br(R,~ 0)
where
is an abelian
group under tensor product.
Warning:
We shall see in (2.5.9)
that the quadratic
analogue
of (.2.3.4) is not true in general. Let
Br0(R,~ 0)
be the kernel of the forgetful map
Br(R,~ 0) ÷ Br(R).
Ass~ne that K.
Let
R
I = the group of R-fractional
g : K* ÷ I
be the map that sends
By sending elements the map
Warnins:
is a Dedekind domain with quotient
~0
: K ÷ K
The map
and fractional
ideals
x E K*
to the u n d e r l y i n g module
[~]
K,
and let
to the ideal
ideals to their
we get an action of
I + Ko(R)
in
field
~/2
images
on
K*
which sends a fractional is not equivariant.
(x). under
and
I.
ideal
Indeed,
s0 [~0 (~-I)] m [~]
(2.5.7)
Theorem:
= HomR(~,R)
There exists
made
into a right R-module
via
~0"
an i s o m o r p h i s m
: Br0(R,a 0) + H0(ZZ/2,K* ÷ I) ~f
{(x,--)
E K* ~ I i~0(x)
{(Y~0(y-I),
-- x - l , ( x ) a
(Y)8~0(S) I (Y,8)
=
~0(~)}
~ K* @ I}
76
The map represents
Y
is defined as follows.
an element
A = EndR(i,1). Let
in
Br0(R,a0).
V = M®RK
and
Suppose
Choose
A = A@RK.
can choose a right A-module i s o m o r p h i s m yields an a n t i - s t r u c t u r e K : EndA(V)
and
adjoint of
h
B = ~0
Let
(v,a)
where
so that
as in (2.5.3) we : V + V~
EndA(V).
ad(h)
a
M
Notice that
: V x V + K
Then
which
be the
Y(A,~,u)
is
is the f r a c t i o n a l ideal
h(M x M).
The map
~
has the following interpretation.
is choosen so that derived from
M
a c R.
Assume
h
Then the (linear) M o r i t a e q u i v a l e n c e
and the pairing
e q u i v a l e n c e of categories nonsingular
on
: V + V ~ = HomK(V,K).
r e p r e s e n t e d by g e n e r a t e d by
(B,v)
h
(A,~,u)
h
: M x M ÷ a
determines
Sesq(A,~,u) ÷ Sesq(R,a0,v).
an
But,
forms are sent to a-valued m o d u l a r forms.
The following result was suggested to us by Karoubl.
(2.5.8)
Proposition:
Any ring w i t h a n t i - s t r u c t u r e
is quadratic M o r l t a equivalent to
8
Proof: and
Let
h : M + N apply
= ~u_la(c)
be the standard basis for
be the dual basis for
be given by
(2.5.2)
where
I )r
{el,e 2}
{e~,e~}
(M2(A),8,1)
(A,~,u)
N = M*.
h(e I) = ue~
and
M = A @ A
Then we let
h(e 2) = e~
and we
to the derived M o r l t a equivalence.
This implies that
Br0(R,m0)
in the sense of F r o h l l c h - W a l l
is isomorphic to
IF-W].
Thus
(2.5.7)
B0(R,~/2) is at least
77
implicit
in [F-W].
(2.5.9)
Samole
(i)
Calculations:
R = K If
charK + 2,
which
then
are represented by
Br0(K,~ 0) = (I) (ii)
Br0(K,id)
when
R = finite extension
(K,a0,1)
s 0 # id of
s 0 # id,
we let
Br0(R,a 0) = (1), Br0(R,a 0)
(ill)
a ring of algebraic in
0,
charK = 2.
~ {+i}
R
is inert over R
is
Br(R,a 0) ÷ Br(K,~ 0)
and (iv) we let and
Z
r,
The isomorphism
and
r.
is not an injection.
R = 0(Z )
where
0
is
is a set of prime ideals (1.3.3).
Br0(R, id) = 2 R* @ F/F 2
F = coker(K* + 7),
Then,
and
ramified over
e.g. the center of the rings in List
(ill) where
when
integers
or
(K,a0,-l).
be the fixed subring of a 0 .
has order 2 when
Notice that
In cases
r
and
P
Br0(R, id) ~ Bro(K,id)
If
has two elements
2 R* = [x E R* I x 2 = 1}.
comes from the following braid
78 which is induced by the following exact sequence of
~
~/2-
modules i ÷ R* + K* ÷ [* + F + i
Remark:
The localization
sequence
(see JR1], §4.2) implies
that
L~(R,.id,1)-_ Similarly,
if
coker(LP(K,id,l)÷
(A,~,u)
a ~ F/F 2 c Br0(R,id ) coker(L~(A,id,l)
L0P(K,id,1)
+
represents and
@ P
and where
@
P
a
A = A@RK ,
Case !:
K
LP(Ap +
L~(R,id,1)
is nontrivial and
~1 e R,
= L~(A,~,U). then
: 2 × order L~(A,a,u).
is unramified over the fixed field of
Furthermore, Br0(R,~0).
0.
Then
Otherwise,
s0
and
Br0(R,~ 0)
Bro(R,~ 0) + Br0(K,e 0) @ wBr0(Rp,~ 0) O if
(A,~,u)
represents
Then
LP(R,~0,1) # L~(A,~,u). Case 2:
L~(A,id,l)
Assume s 0 ~ id.
order 2, but the map
element in
L~(A,~,u)
Ap,id,1) + LR(Rp + Kp,id,1).
Z = the set of all prime ideals in
trivial.
then
L~(Ap + A0,id,l)) , where
order L~(R,id,l) (iv)
Kp,id,1))
an element
But it is not true in general that For example if
L0P(Rp +
has is
the nontrivial
79
Br0(R,a 0) T $ Br0(Rp,~0), where we can sum all finite primes ramified over the fixed field of
p
in
Z
which are
~0 "
These results are proven by using the isomorphism H0(~/2; K* ÷ I) Z fi0(~/2;
where Remark:
If
book [C].
g(K)
# p~
R* x P pES
P
is the idele class group of
R = 0,
v arch
v
K.
then case (iv) is related to Connor's
In fact, HO(~/2; K* ÷ I) ~ Gen(K/K ~0 )
(see chap. I in [C]), and if L~(A,a,u) z Hx(~), symmetric,
(2.6)
where
~(A,a,u) = [(x,=)],
Hx(=)
then
is the Witt group of
x-
=-modular forms studled in chap. IV of [C].
Proof of the Id@ntif%cation Theorem (1.3:5) Theorem (1.3.5) will follow from (2.5.1)
relative version)
(or rather its
if we can prove that (A¢,a¢,u¢)
Morita equivalent to (A¢,8¢,±I)
where (A¢,8¢,I)
is quadratic is one of the
rings with anti-structure in List (1.3.4) From the proof of Theorem (2.3.6),
we know that A¢ is
linearly Morita equivalent to F N, F N, R N, or H N for some N. Let R denote the center of A¢.
Then (A¢,a¢,u¢) a Br(R,a 0) for
some m0" The proof divides into three cases. I)
De is commutative, m0 = Id. Then (A¢,a¢,u¢) e Bro(R,Id).
(2.2.4) (ll), Br0(R,Id) = ~ / 2 ~
From (2.5.9) (iii) and
and from (2.5.9) (i) we see
80 that
(R,Id,l) 2)
and (R,Id,-l)
are the two elements.
De is non-commutative, The calculation
are the two distinct Br(R).
From
in I) shows that
elements
(HN,~I,I)
in Br(R,Id)
which map to [H N] e
so done.
~0 ~ Id. First notice that R with each n o n - t r l v i a l
occurs on List
(1.3.4).
From
we see Br0(R,~ 0) = (i). Remark:
(2.2.4)
Using
A
Henceforth,
on
A.
then,
is to compute
Ln(A ÷ A2,~,I)
(1.3.3)
Recall that
Ln
we shall suppress writing the i in
The results
for any s0,
Sequence
is any of the rings from List
any (anti)-involution
case 2,
is one to one.
Localization
The goal of this section
(iv)
we are finished.
Notice that if R = FN, FN, or RN,
§3.
involution
(i) and (2.5.9)
(2.3.6)
Br(R,~ 0) + Br(K,~ 0)
where
and (HN,al,-I)
(2.3.6) we know that A¢ is linearly Morita equiv-
alent to HN, 3)
a0 = Id.
are summarized
in
Table
and denotes
B
is OcK 0 Ln
(8,1).
I.
(3.1) General Backsround ' Suppose
K
is an algebraic
integers
0.
algebra;
A = R-maximal
involution
of
Let
A.
R = 0[½];
number
D : central,
order in
We assume
Consider the following
field with ring of algebraic
D;
K0(A)
and
simple, B
any (anti)-
has odd order.
arithmetic
square
K-division
81
A÷D + ¢ ~, ~. ~
.
Then, (3.1.1) (by L-theory
Ln(A ÷ D,B) ~ Ln(A ÷ D,8)
Excision
Theorem
(2.1.4))
^
= @ Ln(A
P
÷ D ,8) P
(by 4.1.2 and 4.1.5
where we sum over all maximal such that
(3.1.2) maximal
R
If
If
in
R
p
is a
and such that
B(p) = P
we assume
maps to the trivial K
p
k.
81R = id,
where
Suppose
Morita Theorem:
such that
for some
ideals
8(p) = p.
Local Quadratic ideal in
in [RI])
that
element
in
is the algebraic
81R $ id,
(A,8,1) Br(K,id)
closure
we assume that
over the fixed field for
81K.
~ Br(R,id)
p
of
- {+I},
K.
is unramified
I
Then, Ln(Ap -~ D p ,B) ÷~ Ln(R p ÷ K P ,B)
Proof: (3.1.3)
Apply
(2.5.1)
Divissage
R
such that
p
is unramified
i
Rp,
and (2.5.9)
Theorem:
B(p) = p.
we get
If
(ii).
Suppose
p
is a maximal
81R # id, we also assume
over the fixed field for
81K
.
ideal in that
Then,
since
82
Ln(Rp ÷ K p' 8) ÷~ LP(k^,B), n where
k
Proof:
is the residue field
P
R/O.
See 4.2.1 in [RI].
If
(A,~)
satisfies the assumptions
in (3.1.2) and (3.1.3),
then we get the following localization diagram with exact rows and columns
(3.1.4) •
•
•
LL+I(A÷A 2, ~ )-~Li(D, B )÷ni( A2' ~ )@@LP( kp, B )-~Li(A÷A2, B )....
Li(a,B)
, Li(D,B)
~ @LP(kp,B)-~Li_l(A,B)
0 -map L i IA2, B)
Since
ideals in
i
^
~ ~ A 2,
@ L~(kp,B) R
^
we get that D2
A2 ~ D2 "
(where
0
contains Recall
we are summing over the set of maximal
such that
N.D.
If
is a simple ring.
~(p) = p.
Notice that this is the
same as summing over the ~-invarlant, 0
1
Li_I(A2,S)--Li_I(A2,B)
a unique dyadic prime, then that in
+...
N.D. maximal ideals in
stands for nondyadic).
We shall compute
L,(A + A2,~)
Notice that the domain and range of of L-groups of semi-simple rings.
by computing the map $
@.
is expressed in terms
83
(3.1.5) Semi-simole Theorem: then
LPi+I(A,S)~ = 0
Proof:
If
A
is a semi-simple
for any involution
ring,
S.
See [R2]. A
(3.1.6)
Reduction Theorem:
For any abelian group
(3.2)
Type O-Commutative
We assume
8 = id
Then for any field
Li(Rp, S) = Li(kp,8) ,
G,
where
kp = Rp/p.
2 G = {g ~ Glg 2 = i}.
Case:
(FN,id) , (RN,id) , (FN,id),
which we suppress writing.
K
with
charK ~ 2,
L~(K) = W(K),
the classical Witt ring of symmetric bilinear pairings over K in
(see ILl, [M-H], W(K)
[O'M], and [W4], p. 135).
comes from the tensor product of pairings.
I(K) = kernel r : W(K) ÷ ~ / 2
The group
L~(K) ~ (I)
singular pairing hyperbolic
b
where
is the rank map.
i.e.
b
sequence plus
k
If
for
n ~ 3,2,1,0(4)
is a finite field with
Kp/Qp
with
is
(3.1.5) then imply that
Examples If
non-
3.5).
disc: l(k) T k*/k .2 (ii)
Let
because any skew-symmetric
Ln(K) ~ O,0,2K*,I(K)
(3.2.1)
r
has a symplectic basis,
(see [M-H],
The Rothenberg
(i)
Multiplication
chark ~ 2,
has order 2.
[Kp,~p] = £,
then
then
84
disc : Z(R)/12(Rp) ~ R~/ff~2; Hasse-Witt:
I2(Kp) ~ 2Br(K2 ) ~ {+l}.
then the map
^ ^ L0(K p) ÷ L0(.Rp ÷ Kp) ~ L (kp),
li(K ) P
li-l(k ) P
onto
Ii(Kp) ÷ k*p/k*2p invariant.
^, ^,2 v
÷ Kp/Kp
÷ ~/2
For any
p,
Thus
+
1
Itr
I(Kp)/I2(Kp)
P
sends
(.see [M-H], IV, 1.4).
/tdi'c
0
N.D.,
We also get the following exact sequence
p/ P
where
is
can he identified wlth the Hasse-Witt
1 + ~* 8,2
where
p
If
+ L0(kp)/I(kp) ,
is the integral closure of
0*p : U(Kp) x ~Zp
~
P
in
P
(see [$2], XIV, §4),
p(.Kp) = roots of unity, Thus ~L2
if
p
is
N.D.
^, ^,2 0p/0p = ~/2 ~+I (lii) (iv)
I(@) -__ (0) If
K/@
and
with
if
p
sig : I(]R) ÷ 2 ~ . [K,Q] = r I + 2r 2
the number of embeddings disc
is dyadic
of
K
where into
rI
is
~,
then
: I(K)/12(K) ~ K*/K .2,
Hasse-Witt:
I2(K)/13(K) Z 2Br(K),
and
slg : I3(K) $ @ i3(Rv) ± (8~) rl , where v varies over the real embeddings of K.
v
85
Suppose algebraic
K is a field on 2.2.3
integers
in
K,
and
, 0
is the ring of
R : 0[½].
Since
0
has a
^
unique prime over 2, K 2 sequence
(3.1.4)
are trivial.
is a field and the Localization
implies that
L3(R + R2 )
We also get the following
and
L2(R ÷ R2 )
commutative
diagram
with exact rows and columns. (3.2.2) 0 +
0 +
~2 I2(K)--~ I2(K2 ) @ @ I(k ) + + PND w 0 + LI(R + fi2) + L0(K) +~ L0(K 21 @
@ LP(k 01 ÷ L0(R + fi2) ÷ 0 P N.D. + fl
0
0
The snake lemma then yields the following exact sequence (3.2.3) 0 + ker~ 2 + LI(R + R2 ) ~ ker$ I ~ coker~2 ÷ L0(R ~ ~2) ÷ coker~l ÷ 0
Computation of If
I
:
@I:
group of 0-fractional
ideals in
K
and
r :
ideal class group, then we get the following exact sequence i + 0* ÷ K* ÷ I ÷ F ÷ I
Since
r
has odd order by Weber's Theorem
(2.2.4),
86
we get the following short exact sequence i 1 + 0 " / 0 ~2 ÷ K ~ / K ~2 ÷ t / I 2 ÷ 1
Since any 0-fractional ideal can be expressed uniquely as a product of prime ideals, we can identify
I
with the
free abelian group generated by the maximal ideals in
0.
Thus, ~/Z
2
Z
e ~/2. p~2G,~,u) L (X) is found on column UX on r
the row "odd" if r is odd or on the row "even" if r is even. If X has type 0 or S p'
EX on the row ~ = 3, 2, I, or 0: ~ E r E r+2
Part 2:
(mod 4)
Compute
Lr(X) is found in column
we use subtable O: (mod 4)
if Type X is O;
if Type X is S . P
LP( 7ZG, e,u)
We have reduced this problem to understanding a pair of exact sequences
0 ÷ L;r+l ( 7ZG ÷ ~ 2 G , ~ , u )
L;r ( 7ZG ->~2C,~,u)
- ~2r+~
L;r( 7ZG,c~,u) ----~L2r(2Z2G,(~,u) 0
(for r = 0, I). Some terminology will be useful. A representation (or its character X) is called cyclic if it can be obtained by pulling back the faithful irreducible rational representation of CN along some epimorphism y: G + CN, N >_ 0.
A representation (or its
character) is called dihedral if it can be obtained by pulling back the
114
faithful
irreducible rational representation
of D N along some epimorphism
Y: G ÷ D N, N > 3. The epimorphism y determines X but not vice versa. ~( determines
The kernel of
the kernel of ~,~ but X only determines y up to an automorphism
of the quoient. p
Next we determine ~2r"
Since L r (2Z2G,~,u)
-~ 2Z /2 2Z ,
~2r is either
trivial or one to one. Theorem AI.2.1: ~2r is determined by: ~0 is one to one
iff
there is a type 0 cyclic representation;
~2 is one to one
iff
there is a type Sp cyclic representation.
It is easy to describe t h e right-hand Theorem AI.2.2:
The left-hand
extension.
~2r is a split epimorphism.
extension
is more difficult
to describe,
since even if
K2r is onto, two different things can happen. Associated maps;
to a dihedral representation
YI: G ÷ ±i = DN/CN_ I
representation g,~,b)
iff
is twisted
and
y: G -~ D N
there are two other
Y2: ker Yl ÷ CN-I -~ ±I.
A dihedral
( with respect to the geometric antistructure
¥i is 0 invariant and y2(y-10(y))
= -I
for any (and hence
every) y g G-ker YI" A cyclic representation
is twisted
iff
the composite
G Y-~ C N -~ ±I
sends b to -i. We have Theorem AI.2.3: If K0 is onto, then it is split unless there is a type UI twisted cyclic or a type O twisted dihedral representation.
Then ~0 is
not split. If K2 is onto, then it is split unless there is a type UI twisted cyclic or a type S
P
twisted dihedral representation.
Then ~2 is not split.
If K2r is not split, then any x e L;r(2Z G,~,u) has infinite order.
with K2r(X) = -I
115
To apply the above results it is desirable to be able to find cyclic and dihedral representations.
A return to the theory behind the results in
Part I yields the critera below. A character X is cyclic iff E X = r N or R 0 and X(e) = 2 N or i. character X is dihedral is twisted iff .
iff EX = ~
(b 2N) = -X(e);
and X(e) = 2 N+2.
A
A cyclic character X
a dihedral character X is twisted iff
^N+I
X((g-~O(g)) z
) = -X(e)
for at least one g e G.
Another way to give such representations directly.
is to give the epimorphism y
In this case there is a quicker way to find the type than by
using step 2 of Part i. In the cyclic case, extend ¥: G + CN ~(-g) = -y(g).
to 7: ±G + C N
by defining
Recall that ~ induces a map from G to ±G. X has type UI
iff
X has type 0 or S
~(g-l) = ~(~(g))
for all g e G
~(g) = y(~(g))
iff
for all g c G
P the type is 0 if ~(u) = I; Any twisted dihedral representation define Tg
~(g)X(gO(g)u):
=
T
g
has type 0 or S . P
is either 0
0 if there exists a g ~ G with T
the type is Sp if ~(u) = -I.
= X(e):
X(e), or -X(e). we have type S
g a g 6 G with T
g
For any g e G, We have type if there exists
P
= -X(e).
Any cyclic character with x(e) = 1 is called linear: character with x(e) = 2 is called Ruadratic.
any cyclic
A linear cyclic character
either the trivial character or a cyclic character with y: G + C I. quadratic characters the linear characters
are the cyclic characters with y: G + C 2. are in one to one correspondence
is
The
Notice that
with HI(G; ~ / 2 ~ ) .
Ex@mples: i)
(~G,~,e)
~(g) = g-I
:
any non-linear
U;
all the linear ones are type O.
cyclic representation
Therefore ~2 is trivial:
is type
P0 is one to
one. There are no twisted cyclic or twisted dihedral representations,
so
LP(i !] . . . .
of exact sequences
in the decomposition
Since GL types make no contribution the remaining
">LPr(EgG + ~ 2 G , ~ , u )
+
in
119
In case III we either use Table 2 or Table 3. subtable to use; An i n t e g e r ~
which row of that subtable;
and which columns to use.
mod 4 (or mod 2 on the U + U subtable)
of three groups on each row: contribution
We must decide which
determines
a sequence
this sequence will be isomorphic
to the
of this factor of the map to sequence AII.I.I.
If the type is III2 we use Table 2. If the subtype is mixed it is Type X 0 ÷ Type X. subtype
(A. II.I.2)
subtable
row
0
0 + 0
EX0 c E X
~ ~ r (mod 4)
Sp
0 ÷ 0
EX0 c E X
~ ~ r+2 (mod 4)
U
U ÷ U
UXD + U X
~
0 + U
0 ~ UX
EX0 c EX
~ 5 r (mod 4)
Sp÷ U
0 + UX
EX0 = E X
~ ~ r+2 (mod 4)
U ÷ 0
UX + 0
--
~E
UX ~ 0
-
~
U + S
~ r (mod 21
r (rood 4) E r+2 (mod 4)
P
Remarks:
The -- in the row column means that the subtable
in question
has only I r o w . In the 0 + U
(or S + U ) case we may need to go back to P steps 2 and 3 in Appendix I to compute E X. Note that we do not need EX if we are using subtable
O ÷ UII,
EXo suffices.
If the type is 1113 we use Table 3.
If the subtype is mixed,
Type X -> Type X0. subtype
(AII.I.3)
subtable
row
0
0 -> 0
EX c EX0
~ - r (rood 4)
Sp
O ÷ 0
E X c EX0
~-
r+2 (mod 4)
U
U ÷ U
UX ÷ UX 0
~-
r (rood 2)
0 ÷ U
0 -> UX
E X c EX0
~-
r (rood 4)
S -~ U P U ÷ 0
O + UX
E X c EX0
~--- r+2 (rood 4)
UX ÷ O
--
~-
UX + 0
--
~ - - r+2 (mod 4)
U ÷ S P
r (rood 4)
it is
120
Remark: The only visable difference between AII.I.2 and AII.I.3 is that in the row column we have interchanged the role of X 0 and X.
A closer
study shows that on the O ÷ UI N subtable we need EX to use Table 2 but that on Table 3, this subtable has only one row.
Part 2:
Relative transfer maps
This time our goal is to describe !
(AII.2.1)
... + L ~ ( ~ G ÷ ~ 2 G , ~ , u ) --!~+ L ~ ( = H ÷ ~ 2 H , a , u ) ÷ L~,! 7Z/:~ i 0
0
7Z/~_ ~-'
7Z/z 7z/2
0
7/_12
7~.2
::: 0
7L
17/
7~/0.
{/2
,~ZIZ
! =..~
0 ---', UZ ~ 1
-!
0
II ,
U_~..,-+ o
2
" - ~, i
--.z
i-e~
0
--a
!
'~-z
;
0
o
17]
i 0 ", . . . .
0
0
:7ll2
-/~/2 7/2[ , 0
0
~-z
1~4-' ::72
(~
3~'3':
'~"~'
*
i-e4"' i o
I '
l o
O ----~U:E i
R,._,c& i '
:
o
H..,cH______m.0
B., c ~
0
i
i0 i
!g ,
Z~ghiTLla
i,, 0 I
U--~ U
S~jJ --t
z._,--, uL -TZ
O
w~
!zJ~
, RojJ
, -FT~.M
I
7Z/2
7~/~.
',7/12 'q --.t , 2.l ,7//2
0
I
:0
0
• 1 I
,' ~ , ~ , .
,
I 0
iL 0
b
:, 7f"" 'l 9 u-a
um --, o :~
7z2
~-3
! 0
0 g :a
7/--/2
0
7zi2
;
0
i 7Z/2
7Z~'~ (:9
0
7i/2.
! f.a ',Zl2 &~at&
z&
2
+I
125
REFERENCES
[B]
A. Bak, K-theory of forms,
Ann. of Math. Study, 98(1981).
[B-K]
A. Bak and M. Kolster, The computation of odd dimensional projective surgery groups of all finite groups, Topology, 21(1982), 35-64.
[B-W]
A. Bak and B. Williams, in preparation.
[Bassi]
H. Bass,
[Bass2]
H. Bass, Lectures on topics in algebraic K-theory, Tata Institute (1967).
[B-L]
W. Browder and G. R. Livesay, Fixed point free involutions on homotopy spheres, T6koku J. Math., 25(1973), 69-88.
[Ca]
S. Cappell, A splitting theorem for manifolds and surgery groups, Bull. Amer. Math. Soc., 77(1971), 281-286.
[C-S1]
S. Cappell and J. Shaneson, Pseudo-free group actions I., Proc. 1978 Arhus Conference on Algebraic ToooloF~y, Springer Lecture Notes763(1979), 395-447.
[C-S2]
S. Cappell and J. Shaneson, A counterexample on the oozing problem for closed manifolds, ibid(1979), 627-634.
[C-M]
G. Carlsson and J. Milgram, The structure of odd L-groups, Proc. 1978 Waterloo Conference on Al~ebrai9 ' Topology, Springer Lecture Notes 741(1979), 1-72.
[C-F]
J. W. S. Cassels and A. FrShlich, Alsebraic Number Theory, Washington: Thompson (1967).
[C]
P. Connor, Notes on the Witt classification of Hermitian innerproduct spaces over a rin~ of al~ebraic integers, Texas (1979).
IDa]
J. Davis, The surgery semicharactertic,
[D]
A. Dress, Induction and structure theorems for orthogonal representations of finite groups, Ann. of Math., 102(1975), 291-325.
IF]
J. M. Fontaine, Sur,la d6composition des alg~hres de groupes, Ann. Sci. Ecoie Norm. Sup., ~(1971], 121-180.
[F-Mc]
A. Fr~hlich and A. M. McEvett, Forms over rings with involution, J. Algebra 12_=(1969), 7~-i04.
IF-W]
A. Fr~hlich and C. T. C. Wall, Equivariant Brauer groups in algebraic number theory, Bull. Soc. Math. France, 25(1971), 91-96.
[H]
I. Hambleton, Projective surgery obstructions on closed manifolds, to appear.
Surgery and higher K-theory,
Al~ebraic K-theory, Benjamin
(1969).
to appear.
126
[H-Mad]
I. Hambleton and I. Madsen, Semi-free actions on ~ n with one fixed point, Current trends in Algebraic Topology - Proc. 1981 Conference at University of Western Ontario.
[H-M]
I. Hambleton and J. Milgram, The surgery obstruction groups for finite 2-groups, Invent. Math., 63(1980), 33-52.
[H-T-W]
I. Hambleton, preparation.
[K]
M. Kneser, Lectures on Galois cohomolo~y groups, Tata Institute (1969).
[K-O]
M-A. Knus and A. 0janguren, Th@orie de la descente et A l ~ b r e s d'Azumaya, Springer Lecture Notes 38___99(1974).
[KI]
M. Kolster, Computations of Witt groups of finite groups, Math. Ann., 24__!i(1979), 129-158.
[K2]
M. Kolster, Even dimensional of finite groups, to appear.
[L]
T. Y. Lam, The algebraic theory of quadratic forms, Benjamin (1980), 2nd printing with revisions.
[Le]
D. W. Lewis, Exact sequences of graded modules a graded Witt ring, to appear.
[M1]
I. Madsen, Reidemeister torsion~ surgery invariants and spherical space forms, Proc. London Math. Soc., 46(1983), 193-240.
[Ma]
S. Maumary, Proper surgery groups and Wall-Novikov groups, Proc. 1972 Battelle Seattle Conference on Algebraic K-theory~ Vol. III, Springer Lecture Notes 343(1973), 526-539.
[Me]
S. L6pez de Medrano, Springer (1971).
[M-H]
J. Milnor and D. Husemoller, Springer (1972).
[O'M]
O. T. O'Meara, Introduction Springer (1962).
[P]
W. Pardon, The exact sequence for a localization for Witt groups I!: Numerical invariants of odd-dimensional surgery obstructions, Pac. J. Math., 102(1982), 123-170.
[P-R]
E. K. Pederson and A. A. Ranicki, Projective theory, Topology, 19(1980), 239-254.
[RI]
A, A. Ranicki, Exact sequences of surgery, Princeton (1981).
[R2]
A. A. Ranicki, On the algebraic L-theory rings, J. Algebra, 50(1978), 242-243.
[R3]
A. A. Ranicki, The algebraic theory of surgery I. Foundations, Proc. Lond. Math. Soc., (3)40(1980), 87-192.
L. Taylor,
and B. Williams,
projective
Involutions
in of classical
surgery groups
over
on manifolds,
Symmetric bilinear to quadratic
forms,
forms,
surgery
in the alsebraic
theory
of semisimple
127
[Re]
I. Reiner,
Maximal orders,
[Rog]
K. W. Roggenkamp, A remark on separable Canad. Math. Bull., 12(1969), 453-455.
[Sl]
J. P. Serre, Linear representations Springer (1977).
of finite groups,
[$2]
J.P.
(1979).
[Sh]
J. Shaneson, Wall's surgery obstruction groups G x ~, Ann. of Math., 90(1969), 296-334.
for
[SE]
R. Swan, K-theory of finite groups Lecture Notes 149(1970).
Springer
[T-W]
L. R. Taylor and B. Williams, to appear.
[Wl]
C. T. C. Wall, Press (1970).
[W2]
C. T. C. Wall, On the axiomatic foundation of the theory of Hermitian forms, Proc. Camb. Phil. Soc., 67(1970), 243-250.
[W3]
C. T. C. Wall, Foundations of algebraic L-theory, Proc. 1972 Battelle Seattle Conference on Algebraic K-theory~ Vol. III, Springer Lecture Notes 343(1973), 266-300.
[W4]
C. T. C. Wall, On the classification forms II. Semisimple rings, Invent. ll9-141.
[WS]
C. T. C. Wall, III. Complete 19(1973), 59-71.
[W6 ]
C. T. C. Wall, 241-260.
[W7]
C. T. C. Wall, V. 261-288.
[W8]
C. T. C. Wall, VI. 1-80.
[W9]
C. T. C. Wall, Formulae for surgery obstructions, Topology, 15(1976), 189-210.
[War]
M. L. Warschauer, The Witt group of degree k maps and asymmetric inner product spaces, Springer Lecture Notes, 914(1982).
[Was ]
L. C. Washington, Springer Graduate
[Y]
T. Yamada, The Schur subsrou p of the Brauer group, Springer Lecture Notes, 397(].974).
Serre,
Local fields,
Academic
Press
Springer
(1975).
orders,
and orders,
Surgery on closed manifolds,
Surgery on compact manifolds,
Notre Dame University Notre Dame, Indiana 46556
of Hermitian Math., 18(1972),
semilocal
IV. Adele rings, Global rings, Group rings,
Academic
rings,
ibid.,
ibid., 23(1974), ibid., 23(1974), Ann. of Math.,
103(1976),
Introduction to cyclotomic fields, texts in mathematics, 83(1982).
McMaster University Hamilton, Ontario LSS 4KI
