ARCHITECTURE
SCIENCE, No.7, pp.1-19, June 2013
Limits and Errors: Optimising Image Pre-Processing Standards for Architectural Fractal Analysis Michael J. Ostwald! I Professor, 2
Josephine Vaughan 2*
Department of Architecture, University of Newcastle, Australia Research Academic, University of Newcastle, Australia
* Corresponding
author Email:
[email protected];
Tel:+61-2-49854186;
Fax:+61-2-49216913
(Received Nov. 30,2012; Accepted May 17,2013)
ABSTRACT The box-counting variation of fractal analysis is the most common approach to calculating the visual complexity of buildings, cities and landscapes. This method derives a numerical value from an elevation or plan of a building or space, which reflects the amount of detail present in that image across multiple scales of observation. As a way of analysing urban plans and buildings, a range of scholars and designers have employed However,
the box-counting
despite the volume of this past research,
method over the last eighteen years.
the methodological
limits - including the
magnitude of potential error rates that are caused by variations in the images used - are yet to be quantified. As a consequence, mathematical
often widely varying results have been produced using the same
method and, ostensibly at least, the same image. In response to this situation, the
present paper tests four factors that are associated with image pre-processing
standards for the
box-counting method and which, it has been theorised, have an impact on the results. For these four factors, multiple permutations
of each of seven different test images are analysed in this paper in
order to determine the limits or sensitivities associated with each factor. The results of this analysis are used to understand the impact of variations in each of these data preparation factors. Thereafter, they are used collectively to identify an optimal range of standards for the initial architectural image data.
KEYWORDS:
Fractal Analysis, Computational Analysis, Visual Complexity, Methodological Limits
ARCHITECTURE
SCIENCE. No.7. June 2013
1 Introduction
(1: 100, 1:500 etc.) because the method calculates the visual complexity of the representation
Fractal geometry
of the building,
is used to describe irregular or regardless of its size. The algorithmic process involves
complex lines, planes and volumes that exist between overlaying whole number integer dimensions.
multiple
different
scale
grids
on
the
Thus, instead of an architectural
image
and
calculating
how
much
object having a dimension (D) of 1, 2, or 3, a fractal information
is contained in each square of each grid.
analysis of an irregular image or object might reveal a D Once the complete set of data has been collected in this of 1.51, 1.93 or 2.74 (Mandelbrot, 1977). The process of way, determining
the fractal dimension
the
results
are
mathematically
processed
to
of an object was calculate the fractal dimension of the image.
initially
demonstrated
in mathematics
in the
1980s Past
(Mandelbrot,
1982;
Voss,
1988)
and
it
research
seemingly commonly
has
noted
that
despite
being
a
became straightforward
process,
the results of the
used in the physical and medical sciences box-counting method are sensitive to variations in both
throughout the 1990s (Ashkenazy,
1999; Cross, 1997). the raw data (the "starting image") and the algorithmic
While there are multiple methods for determining
the process used to extract information from the data (Bovill,
fractal dimension of an object, Voss's
"box-counting" 1996; Lorenz, 2011; Ostwald, et aI., 2008). While the
approach (1986) is the most widely used and it was the algorithmic
process
has recently
been optimized
for
first adopted for architectural and urban analysis in the architectural analysis (Ostwald, 2013), the impact of the 1990s (Batty & Longley,
1994). Since that time, this image properties
remains
unknown.
Because
of this
method has been used for the analysis of the fractal problem past researchers using this method have relied dimension of a number of canonical buildings, ranging on a range of theorized "best-practice" from ancient
structures
to twentieth
(Bovill, 1996; Burkle-Elizondo&
century
standards for the
designs
Valdez-Cepeda,
preparation
of images
preparation
protocols
(such
as consistent
drawing
2006; and representational
systems) to
Md Rian, et aI., 2007; Ostwald, et aI., 2008). A stable moderate the potential negative impact of inconsistencies computational version of the method has also been used (Cooper&
Oskrochi,
2008).
While
such
image
to conduct a series of studies of the formal properties of pre-processing famous
houses
(Ostwald
&
Vaughan,
2009),
standards
inconsistencies, longitudinal
study of the architecture
may
assist
to control
the
a their
actual
impact
has never
been
of Frank Lloyd quantified. Therefore, the purpose of the present paper is
Wright
(Vaughan
&
Ostwald,
2011)
and
of
the to quantify
relationship
between
environmental
geometry
the error rates that might
arise in the
and box-counting
method
as a result
of diverse
Image
designed geometry (Vaughan & Ostwald, 2010). standards There
are
three
major
method;
raw
components
to
the
(typically
an
process
for
and to confirm the practical
limits within
which the method will provide stable results. box-counting
data
There architectural
drawing),
an
algorithmic
architectural
are
four
factors
associated
with
the
drawing or image being analysed, which
extracting information from the data and a mathematical past research has suggested have a potential impact on procedure
for calculating
the fractal dimension
of the the results. These are "white space", image position, line
data. The architectural image must be a black and white thickness and image resolution. In the present paper, to line drawing; usually an elevation or plan (see figures 1quantify the impact of each of these factors a series of 7). The scale of the image on the drawing is irrelevant 2
Limits and Errors: Optimising Image Pre-Processing Standards for Architectural Fractal Analysis
seven test images
are examined each
(five of which are
architectural
elevations),
with
a
number
permutations
of the relevant factor. By tabulating and
plotting the results of these permutations,
of
their impact
can be seen on each factor. For example, as the fractal
of data types for analysis. This information is important to ensure the reliability and repeatability of future results and to assist in the interpretation
and validation of the
results of past research. This paper commences
with an overview
of the
dimension of a line drawing is within a range between
box-counting method, which explains in more detail why
1.0 and 2.0, the difference between a dimension of D =
the nature of the original raw data, the architectural
1.305 and D = 1.256 (a difference
drawing, has a potential impact on the results. Thereafter
of 4.9%) can be
readily determined for comparison. Multiple test images
the method used to test and quantify this impact is
are needed
described in more detail, before the results of the four
for the study because
method
(the mathematical
several
known
the box-counting
and algorithmic
sensitivities
which
mean
core) has that
larger
sample sizes are needed to have confidence in any trends identified (Foroutan-Pour,
separate tests are outlined. Finally, the paper concludes by providing
a new, best practice
data standard
for
architectural fractal analysis.
et al., 1999; Camastra, 2003; 2 The Box-Counting Approach
Jelinek, et al., 2005). Five houses were selected for this study based on the typical range research
(Ostwald
& Vaughan,
identified 2009;
in past
Vaughan
&
The
visual
assessed
complexity
of architecture
can
in various ways, from phenomenological
be or
Ostwald, 2010; 2011). In addition, two abstract shapes
perceptual
were added to the set of images for comparative purposes.
2003;
The rationale for the complete set of images is described
approaches
later in the paper.
Several computational approaches exist for analysing the
For each of these images, a series of variations were produced which represent different permutations factor being considered.
For example,
because
understandings
Pallasmaa,
2005)
(Stamps
(Nasar, to
1989; Stamps
mathematical
III, 2005;
III,
analytical
Wong, et al., 2012).
visual complexity of architecture including distribution
of the
analysis
by Zipfs
it is
fractals
(Stamps,
law, Van der Laan septaves 1999; Crompton
& Brown,
and 2008;
theorised that the line weight in the original drawing
Crompton, 2012). This paper addresses the box-counting
might have an impact on the calculated result, for each of
method of fractal analysis, a computational
the seven
of line
used to measure the amount of detail found in an image
were then
of a building. To calculate the fractal dimension of an
thickness
test images, were prepared.
eleven
permutations
The 77 results
application
calculated and compared with the theoretical ideal setting
architectural
and any patterns in the results identified. At the end of
the process commences by superimposing
the process, the most stable data settings were identified,
over the elevation and determining if any lines from the
along with, in several cases, the limits and indications of
facade are present in each square. Those grid boxes that
error rates. In this wayan
have some detail in them are recorded. Next, a grid of
optimal range of settings are
identified for the first time in architectural
and urban
elevation using the box-counting
method,
a large grid
smaller scale is placed over the same facade and the
applications of this method. These optimal settings are
same determination
ones that either reduce the potential sensitivities in the
in the boxes of the grid. A mathematical comparison is
method or focus it into the most robust and reliable range
then constructed
is made of whether detail is present
between
the number of boxes with
3
ARCHITECTURE
SCIENCE. No.7. June 2013 The data post-processing
detail in the first grid and the number of boxes with detail in the second grid. This comparison is made by
methodological
plotting
mathematical
a log-log
diagram
for each grid size. By
settings
variables - that is, those
that
procedure
shape
is undertaken
the
way
the
- include
grid
repeating this process over multiple grids of different
disposition
scales, an estimate of the fractal dimension of the facade
grids); scaling coefficient (the ratio between grids); and
is produced (Bovill, 1996; Sala, 2007; Lorenz, 2011). In
statistical
practice,
pre-processing variables are divided into field properties
all serious
analysis
using the box-counting
(placement
divergence
and orientation
(error
of successive
handling).
The
image
method is undertaken using software. This is because the
(white space and image position) and image properties
more grid comparisons that are made, the more accurate
(line-weight and image resolution). In the field properties
the result. However, every grid comparison involves an
category, white space is the volume of area around the
increase in processing
time and effort; meaning that,
image that is processed as an integral part of the set of
while the first two scales of comparison might involve
calculations and "image position" is the distribution of
only the analysis
white space relative to the location of the image. In the
of 40 or 60 cells,
by the
12th
comparison the number will be much more. For example,
image properties category, image resolution refers to the
Ediz & Ostwald (2012) undertook a fractal analysis of a
number of "dots-per-inch"
Turkish Mosque and recorded more than 12800 pieces of
saved at (or compressed to) and line thickness is the line
information in a single facade, and calculated the fractal
weight of the drawing being analysed. While the statistical validity of the fractal analysis
dimension of the entire building using over one million results.
For the present
undertaken
paper,
using Archlmage
all calculations
(Vers.1.16),
were
all images
(dpi) the image has been
method is largely reliant on the data-post variables,
image pre-processing
processing
factors also have the
were prepared using ArchiCAD (Vers.14) and for some
potential to cause errors. It is these factors that are
permutations,
investigated in the present paper. Moreover, these factors
modified
using Adobe
Photos hop CS2
(Vers.9.0). The
are particularly perplexing for people using the method box-counting
simplicity,
method,
despite
its apparent
is actually made up of multiple, complex,
because it is possible to test four seemingly
identical
elevations, which are all derived from the same CAD file,
meaning that it is relatively
but because of the way they have each been saved,
difficult to isolate the impact of anyone factor. It is also
positioned, or set-up, will produce different results. Each
known to have particular
of the four image pre-processing factors are described in
interconnected
processes,
strengths and weaknesses
certain ranges of dimensions types (Foroutan-Pour,
and for particular
in
image
more detail hereafter.
et aI., 1999). As a result of this, 2.1 White Space and Image Position
scientists
and mathematicians
mathematical methodological combination,
refinements, and can
along
data have
have identified
quality an
with
a range
variables
impact
on
several
that,
the
of
The background on which the image being analysed
10
is placed, is called the field. This field comprises three
results
components, white space, image space and empty space.
(Camastra, 2003; Jelinek, et ai, 2005). These variables
The
can
surrounding the image, "image space" refers to the lines
be
broadly
divided
into
two
post-processing and image pre-processing.
4
types;
data
descriptor
"white
space"
refers
to the region
that make up the image and "empty space" is any region
Limits and Errors: Optimising Image Pre-Processing Standards for Architectural Fractal Analysis
enclosed by the lines. The image space, and the empty
because it is the first determinant of the practical limits
space within the image are effectively fixed quantities,
of the analytical process (Buczkowski, et al., 1998). The
but the initial amount of white space is determined when
larger the field, the more grid comparisons
the image is positioned on a "page" prior to analysis.
constructed and the more accurate the result. However,
Why is this significant?
increasing the image size increases the processing power
Because,
hypothetically,
the
more white space there is around an image the more the
needed and the practical
results are skewed by factors that are not intrinsic to the
around 3 Megabytes.
elevation (being the combination
may be
limit for current software is
of image space and
The line thickness factor relates to the width of the
if there is almost no white
lines in the image being analysed. If the image is drawn
space (that is, the image is tightly cropped), then the first
in a heavily weighted line, it is thought that the method
few grid comparisons may be statistically biased because
will incorrectly
every cell may have information in it.
thickened lines will be counted twice (or more), with
empty space). Alternatively,
Just as the volume of white space surrounding the
calculate
the dimension
because
the
each smaller grid scales, leading to a high error rate & Taylor,
image is thought to have an impact on the result, so too is
(Taylor
the location of the white space relative to the image
practical
space. If, for example, the field is twice as large as the
should be pre-processed with edge detection software to
image on it, then the image could be positioned
convert every element in the image into one-pixel-width
range of alternative
in a
locations on that field. If it was
1991; Chen,
et al., 2010).
solution to this problem
The
is that all images
lines (Chalup, et ai., 2009). Alternatively,
it has been
placed to the left side of the field, a large amount of
suggested
white space will appear to the right. However,
CAD software to choose the finest practical line that it
if the
that all images should be pre-processed
image space is primarily on the top right of the field, the
can produce.
white space on the lower left will be counted
additional
in a
Line weight
reason.
As
is also relevant
previously
stated,
in
for one the
scale
different iteration of the box-counting process, with both
(meaning 1: 100, or 1:50) of the image representation
architectural
irrelevant for the method, but for any useful comparison
images, essentially the same, but possibly
resulting in different fractal dimensions.
is
to be made between different buildings, the architectural drawings must display a similar level of detail and using
2.2 Image Resolution
and Line Thickness similar representational
Too often in architectural
(which include line
analysis,
weight). This is also why most past uses of the method
the size of the image being analysed is given as a metric
have compared houses with other houses, or urban plans
measure;
with other urban plans,
description
for
example,
is often
computational
standards
"200mm
meaningless
x
100mm".
because
This
it is the
because
a similar
level of
resolution must be represented.
resolution of the image - its dpi - and its size in pixels that is relevant, not its physical size. The same image, printed at the same physical size, will be very blurry at
3 Research Method Four image-processing
factors are examined in this
75dpi but very sharp at 500dpi. Thus, the field size of a
paper using seven standard test images. Between five and
digital
eleven permutations
image must be understood
as its length and
breadth measured in pixels. The field size is important
to the particular
of each of the test images, tailored factor
being
considered,
are each
5
ARCHITECTURE
SCIENCE. No.7. June 2013 a fractal dimension result (DEst.),
artificial "elevations" were added to the set. The first of
which was in tum, after an initial review of results,
these is an empty square (like a blank facade) which was
compared with a target result (DTarg).
expected
processed
producing
While it is possible that an architectural could contain some level of representation
drawing
of the colour
to have the lowest result. Indeed, for some
permutations
of the analytical process the square was
repeatedly measured as having a fractal dimension
of
or materiality of a building, or a sense of its inhabitation
around 0.998, which means that it is so minimal that it is
(entourage
(plants and
no longer an image, but has become a "dust" of points
trees) and time of day (shadows), these features are not
(Mandelbrot, 1982). The second artificial image added to
conventionally represented in the images used for fractal
the
analysis. For the present paper the test images are all
(suggesting a highly detailed facade) which was intended
black and white, computer-produced
line drawings. The
to be within the higher part of the range, and in practice,
process for deciding which architectural elements should
always measured as the second highest result (Figs 1 & 2).
elements)
be included "significant
the local vegetation
in the drawing
involves
the logic
set
being
tested
was
a densely
packed
grid
of
lines" (Ostwald & Vaughan, 2012); that is,
the level of detail present in the building representation which is significant for the purpose of the study. The levels selected for the test images in this paper are limited to the outline, primary form and secondary form of the design. This includes the silhouette of the building
Figure 1 "Square" and any changes in form and material represented by a single line separating surfaces. Basic mullions in doors and windows, stair treads and other elemental projections of a similar scale are included. These representational standards have been used for the fractal analysis of Le Corbusier's Villa Savoye (Bovill, 1996) and of an urban district in Istanbul (Cagdas, et aI., 2005). The seven test images include five elevations
of
works by well-known architects and two artificial shapes. The elevations
were selected because, based on past
published results (Bovill, 1996; Lorenz, 2011; Ostwald & Vaughan, 2009), they represent a range of D values spanning from a relatively
simple facade composition
through to a very complex one. The D results for the elevations typically fall between l.3 and l.6, called the "architecture range", because most buildings have levels of visual complexity that are in the mid range. However, to further test the limits of the method, two additional
6
Figure 2 "Grid" After the square, the image with the lowest D result is the south elevation of Kazuyo Sejima's House in a Plum Grove (2003); a typically minimalist facade from this Japanese architect (Fig 3). The next pair of facades, which have similar levels of visual complexity, are the north elevation of Eileen Gray's Tempe
a Pailla
(1934)
(Fig 4) and the north elevation of Robert Venturi and Denise Scott-Brown's
Vana Venturi House (1964) (Fig
5). Thereafter, the north elevation of Le Corbusier's
Villa
Savoye (1928) (Fig 6) is the next most complex and
Limits and Errors: Optimising Image Pre-Processing Standards for Architectural Fractal Analysis
finally, the most complex facade tested is the south
image-processing
factors. For white space (Fig 8), nine
elevation of Frank Lloyd Wright's Robie House (1910)
permutations
of each test image were prepared.
(Fig 7).
permutation
involved
gradually
adding
Each
a controlled
amount of white space around the same image (growing
D
CD
the field). The first image tested had only a minimal amount of white space (that is, it was cropped very close to the elevation)
and the incremental
growth
was
determined for each test image by calculating the number of pixels equivalent to a given percentage of the shortest Figure 3 House in a Plum Grove, South elevation, Kazuyo Sejima
image dimension (I) and adding half of this value to each side of the image, creating the final field (Fig 9). This provides a consistent area, relative to the image space, for all of the test images. The percentage
increments
used are 0, 10, 20, 40, 50, 60, 70, 80, 90 and 100%. For the image position factor (Fig 10), the same image was placed on the same field but in one of nine Figure 4 Tempe
a Pail/a,
North elevation, Eileen Gray
different
positions
creating
different
relationships
between the white space and the image. The field size was determined for the initial image by adding 100% of the length of the shortest side of the image (I) to each side. Then, within this oversized field, the image was located Figure 5 Vana Venturi House, North elevation, Venturi and Scott-Brown
in nine different
combination
positions;
designated
by a
of left, centre or right and top, centre or
base. The impact of line thickness
was examined
by
producing eleven permutations of each of the test images
u
with different weights and the results calculated (Fig 11). For this last process, the standard edge detection and
Figure 6 Villa Savoye, North elevation, Le Corbusier
reduction settings in the software were disabled. The line weights tested are 1pt, 1Opt, 20pt, 30pt, 40pt, 50pt, 60pt, 70pt, 80pt, 90pt and 100pt width. It is also possible to express these weights as a proportion of the length of the shortest side of the starting image (I). For example, if 1 =
Figure 7 Robie House, South elevation, Frank Lloyd Wright
1000 pixels, then a Ipt line is 0.0011 and a 30 pt line in the same image would be 0.03/.
For each of the seven test images, permutations
were
prepared
to
examine
a series of the
four
However, because the
present research is comparing a set of images that do not possess a consistent I, this approach is not used.
7
ARCHITECTURE
SCIENCE. No.7. June 2013
CD
1
CD
I
~DJ
~ml
!
Figure 8 White space incremental
01i
growth at 0, 50% and 100%
Figure 9 Robie House, white space increase " , ..... #
•. t.;_ ~
~
l-
a~l-l
i;
II .
:.
~
.
t
'•
,
,-!
1
..
~ h
t' .
H ;
J=t
'! •.• ~••• L
"If
,
,; #'
..
.~
Figure 10 Image position for the grid: left base, left centre, left top, centre top, right centre, right base
Figurell
Line thickness, Vanna Venturi House 1pt, SOpt, 100pt
..
Figure 12 Image resolution, Tempe it Pailla, Sdpi (left) and 17Sdpi (right)
8
Limits and Errors: Optimising Image Pre-Processing Standards for Architectural Fractal Analysis
For the final factor, image resolution (Fig 12), the
The DEst results were tabulated and charted. Using
a)
test images
were
of
this data, and informed by past, theorised ideal
compression.
This was done by starting with a 175dp
standards, a "target" permutation was chosen for
then, each test image was resampled (bicubic) reducing
comparison for each of the four factors. The target
the resolution from 175, to 150, 125, 100 and finally 75.
is the setting which past research has suggested -
Resampling
either based on logic, observation or experience -
the
saved
at five different
image
kept
the
levels
same
physical
would be the most stable one against which others
dimensions but changed its pixel dimensions. In total, using seven test images to examine between
could be compared. Through such a comparison
five and eleven permutations of four factors, 245 results
any trends in the results can be quantified, and the
were produced (from almost 2000 calculations) (Table l).
suitability (or not) of the various permutations can
In order to ensure that each factor being tested was
be examined.
isolated from other variables, and its impact able to be
theorised target setting was confirmed by the test
measured,
all other factors
results as being optimal. In the other two tests, the
standards.
For example,
were set to a range of
except
In two of the four cases
results were less differentiated
for the test of line
the
and a range of
weights, all other line weights being analysed were set at
stable results were identified for comparison.
1pt thickness. Next, except for the examination
this situation, the central setting in the range was
of the
impact of image positions, all other images were centred
chosen as the "target"
on their fields. Finally, both the line weight and image
interpretation
resolution tests were conducted with a consistent volume
absolute indicator.
of white space around them which was determined by
The
b)
In
and used to assist the
of the results, rather than as an
difference,
expressed
as
a percentage,
calculating the shortest dimension of each image in the
between the DEst and DTarg results were recorded.
set and adding 20% of this length to each side of the
The
image (defining the field). The data processing settings
calculated as well as its correlation
used for all calculations
(R2). The R2 value is an indicator of degree to
were scaling
1.41421, edge growth (Top-Left)
coefficient
grid disposition
of and
average
of these
differences
was
then
co-efficient
which one body of data may be efficaciously compared to another. In this case, the paper charts
with no correction for statistical divergence.
the results of the permutations
(DEst) against the
3.1 Data Analysis Method target For each of the four factors following
processes
were
followed
fractal
dimension
equal
For a
the
perfect
to interpret
the
lower the result below one, the less consistent the
results.
R2 should
(DTarg).
tested,
being
correlation,
value
1.0. The
correlation. Despite this, because all of the tests in Table 1 Summary
Factors Description of permutations examined White Space Increase white space: 0-100% Image Position Various image positions, 1 field Line thickness Saved at line weights 1-100pt Resolution Saved at 75-175 dpi Total number of results
of Tests
Target for com~arison 50% increase Centre field 1 t
Test images
{#} 7 7 7 7
Permutations
{#} 10 9 11 5
Results
{#} 70 63 77 35 245 9
ARCHITECTURE
SCIENCE. No.7. June 2013
this paper are comparing
variations
of similar
particular factor and are not universal.
images, even the worst of the R2 results, 0.84, is
4 Results and Discussion
relatively high. c)
The tabulated data was analysed using a scatter graph
of D results
and a distribution
4.1 White Space
graph, The theorised impact of white space has been one of
charting results against the percentage gap (DEs! the more contentious issues in fractal analysis with many DTarg) to identify patterns and to quantify limits. authors ignoring the issue and others suggesting various This process clarifies the range of divergences approaches
to handling
it (Bovill,
1996; Cooper
&
from the target figure and assists to identify trends Oskrochi 2008; Ostwald, et al., 2009). There is a broad and quantify the average magnitude of errors. For agreement, these charts, linear and polynomial
amongst
those who have considered
the
trend-lines question, that some white space around the image is
were used to assist the analysis. necessary, but that too much will undermine the veracity The result with the highest percentage
difference of the method. An initial review of the results (Table 2,
was identified;
this is effectively
the worst result or Fig
13) confirmed
this,
suggesting
that
the
most
highest error. For evaluation purposes, anything with less consistent
set were in the central part of the graph
than 20% of this level of difference was considered as (between 30% and 60% white space) and so the 50% indicating
either a reasonable
level of accuracy
or a result was selected as the target (Fig 9). In this zone there
stable or robust zone in the results. This also means that was typically less than a 1.58% average variation caused the limits used to analyse each factor are relative to that Table 2 Results of white space analysis White Space 0% 10% 20% 30% 40% 50% 60% 70% 80% 90% 100%
10
Square
Sejima
VSB
Gray
Le Corbo
Grid
Wright
1.038
1.217
1.241
1.305
1.315
1.398
1.528
% diff
5.00%
0.80%
0.70%
4.90%
1.50%
2.90%
0.00%
1.017
1.242
1.237
1.286
1.304
1.401
1.506
% diff
2.90%
3.30%
0.30%
3.00%
2.60%
3.20%
2.20%
0.977
1.173
1.254
1.279
1.397
1.382
1.508
1.10%
3.60%
2.00%
2.30%
6.70%
1.30%
2.00%
0.991
1.196
1.259
1.283
1.328
1.388
1.557
%diff
0.30%
1.30%
2.50%
2.70%
0.20%
1.90%
2.90%
1.004
1.172
1.241
1.261
1.34
1.38
1.545
%diff
1.60%
3.70%
0.70%
0.50%
1.00%
1.10%
l.70%
0.988
1.209
1.234
1.256
1.33
1.369
1.528
0.00%
0.00%
0.00%
0.00%
0.00%
0.00%
0.00%
0.998
1.196
1.255
1.278
1.333
l.403
l.53
%diff
1.00%
1.30%
2.10%
2.20%
0.30%
3.40%
0.20%
0.992
1.179
l.27
1.276
1.337
l.404
l.549
% diff
0.40%
3.00%
3.60%
2.00%
0.70%
3.50%
2.10%
0.974
1.237
1.268
1.237
1.354
1.387
l.52
% diff
1.40%
2.80%
3.40%
l.90%
2.40%
1.80%
0.80%
0.941
1.148
1.262
1.236
1.344
1.373
1.507
% diff
4.70%
6.10%
2.80%
2.00%
1.40%
0.40%
2.10%
1.036
1.248
1.261
1.242
1.331
1.463
1.488
4.80%
3.90%
2.70%
1.40%
0.10%
9.40%
0.40%
% diff
%diff
% diff
Av.
% diff 0.9818 1.80% 0.9535 2.43% 0.9620 2.98% 0.9929 1.92% 0.9884 1.45% 1.000 Target 0.9912 1.58% 0.9854 2.48% 0.9912 2.18% 0.9712 2.47% 0.8427 2.98%
Limits and Errors: Optimising Image Pre-Processing Standards for Architectural Fractal Analysis
10.00%
•
•
Square
•
Sejlma
A
VSB
X
Gray
o
LeCorb .
•
Grid
+
Wright
8.00%
o a. ro
•
6.00%
o "g 0
--
4.00%
Poly. (Square)
••••••••• Poly. (Sejlma)
2.00%
0.00%
---.-
Poly. (VSB)
-.-.-
.• Poly. (Gray)
---.
Poly. (Le Corb.)
-.-.-
Poly. (Grid)
- .. - . Poly. (Wright)
White Space
Figure 13 Results, impact of white space by the differing quantities of white space (Fig 8). Outside
such outliers.
of this zone, while not consistent, the average growth in 4.2 Image Position variation was in the order of 3.98%, with isolated results up to 9.4%. After
The results for the image position test were the least considering
image-processing space
with
best
consistent of any of the four sets examined in this paper
setting was either 40% or 50% white
(as reflected in the R2 results) (Table 3, Fig 14). With no
a typical
these
of
less
the
±0.74%
clear pattern in the results, the centre-centre position was
divergence. The magnitude of errors caused by too little
adopted as the target value for the analysis. However,
white space was relatively
in the
with the highest difference result being 11%, the optimal
± 1.2% range, but for larger amounts of white space this
zone was therefore any average difference result of less
grew to around ±1.49%, with higher trends suggested
than 2.2%; significantly, a range which none of the other
beyond that (> ±2%). However, despite this and taking
permutations consistently fell within. If then, the results
into account the R2 results, it is also clear that within the
by position are considered relative to the centre, the only
30% to 60% range white space has less impact on the
position which had a similarly "low" set of error rates
results
was the centre-base position (±1.25%) with the top-left
than previously
range
results,
than
similar, commonly
suggested
with none of the
average differences in that range being above ±0.86%. In this set of results one test image showed a much higher sensitivity to the changes than any other. The grid
being the worst, (±2.14%). In combination though, the magnitude of the error rates, regardless of position, was relatively minor.
had a low result of 1.1% difference and a high of 9.4%,
Once curiosity in this test relates to the Villa Savoye
more than double the typical range for the test images.
elevation which had a wide range of results from a low
There is no way to explain this anomaly using the
of 1.1% difference to a high of 11%. For the remainder
present results although a larger range of test images,
of the test images, a much smaller range of between
including a carefully graduated
1.3% and 4% was more common.
series of regular grid
patterns, could be examined in a future study to consider
11
ARCHITECTURE
SCIENCE No.7
June 2013
Table 3 Results of image position analysis Image Position
Square
Sejima
DEs!
1.036
% diff DEs!
VSB
Gray
1.179
1.279
1.288
1.342
1.462
1.524
0.00%
6.90%
1.80%
1.50%
1.10%
0.10%
3.60%
1.048
1.201
1.281
1.251
1.402
1.488
1.516
% diff
1.20%
4.70%
2.00%
2.20%
7.10%
2.50%
2.80%
o-;
1.036
1.248
1.261
1.273
1.331
1.463
1.488
%diff
0.00
0.00
0.00
0.00
0.00
0.00
0.00
Centre-Base Centre· Top Centre . Centre Left· Base
Le Corbo
Grid
DEs!
1.062
1.208
1.303
1.321
1.387
1.478
1.535
% diff
2.60%
4.00%
4.20%
4.80%
5.60%
1.50%
4.70%
Left- Centre
DEs!
1.062
1.186
1.287
1.276
1.367
1.452
1.502
% diff
2.60%
6.20%
2.60%
0.30%
3.60%
1.10%
1.40%
Left-To P
DEs!
1.077
1.229
1.287
1.295
1.441
1.504
1.527
% diff
4.10%
1.90%
2.60%
2.20%
11.00%
4.10%
3.90%
Right -Base
DEs!
1.05
1.202
1.294
1.304
1.359
1.46
1.534
% diff
1.40%
4.60%
3.30%
3.10%
2.80%
0.03%
4.60%
Right -Centre
DEs!
1.05
1.19
1.285
1.261
1.343
1.433
1.5
% diff
1.40%
5.80%
2.40%
1.20%
1.20%
3.00%
1.20%
DEs!
1.062
1.221
1.287
1.289
1.41
1.477
1.523
% diff
2.60%
2.70%
2.60%
1.60%
7.90%
1.40%
3.50%
Right -Top
2.50% 0.9598 3.55% 1.000 Target 0.9625 4.13% 0.9694 2.53% 0.9465 4.28% 0.9142 3.07% 0.962 2.47% 0.9673 3.28%
o 10.00%
u
o
a. TO
t.9
•
6.00%
"if'.
DEs!
0.9645
12.00%
8.00%
R2 DTargto
Av. % diff
Wright
•
Square
•
Sejima
...
VSB
X
Gray
o
Le Corbo
•
Grid
+
Wright
.............Poly. (Square) --
4.00%
-
Poly. (Sejima) -
- Poly. (YSB) . Poly. (Gray)
2.00%
0.00%
- - -
Poly. (le Corb.)
-
. -
Poly. (Grid)
-
-
Poly. (Wright)
tmage Position
Figure 14 Results, impact of image position analysis of the same box-counting
grid; a lpt line is
4.3 Line thickness either emphatically The clearest trend in any of the results was for the line weight
factor.
It was readily
apparent
in the
preliminary analysis that, as the line weight increases, so
inside or outside a 1pt grid line,
whereas a 20pt line can be partially inside (say, 8pts) and partially
outside (12pts) which means that it will be
counted twice at that scale.
too does the calculated result (Table 4). The target line
With the thinnest line as DTarg, the DEst, value grows
weight for this comparison was therefore the thinnest,
relatively steeply in the chart as the lines thicken and as
1pt, as this cannot be counted multiple times in an
confirmed by the R2 results (Fig 15). However, both of
12
Limits and Errors: Optimising Image Pre-Processing Standards for Architectural Fractal Analysis
the first two permutations, the line weights of I and 10,
remam
each have identical results. Beyond the 10 point line
increases to 30point whereupon the error rate increases
thickness, the more abstract test images - including the
slightly, remaining at around 3.4% (20% of 17) until the
Square, Grid and Sejima's
50 point permutation
elevation - display a rapid
rate of increasing errors. Most of the other architectural
largely
unchanged
until
the
is reached
line
thickness
and the error rate
escalates.
images -by Gray, Le Corbusier and Wright - tend to Table 4 Results of line thickness analysis Line Thickness Ipt. 10 pt. 20 pt. 30 pt. 40 pt. 50 pt. 60 pt. 70 pt. 80 pt. 90 pt. 100 pt.
Square
Sejima
Gray
VSB
Le Corbo
Grid
o-;
0.977
1.196
1.279
1.279
1.397
1.382
1.51
%diff
0.00%
0.00%
0.00%
0.00%
0.00%
0.00%
0.00%
DEs!
0.977
1.196
1.279
1.279
1.397
1.382
1.513
% diff
0.00%
0.00%
0.00%
0.00%
0.00%
0.00%
0.00%
DEs!
0.977
1.216
1.279
1.279
1.397
1.382
1.513
% diff
0.00%
2.00%
0.00%
0.00%
0.00%
0.00%
0.00%
1.279
1.298
1.397
1.434
1.513
0.00%
5.20%
0.00%
DEs!
0.998
1.237
% diff
2.10%
4.10%
0.00%
1.90%
DEs!
1.015
1.25
1.279
1.311
1.413
1.458
1.513
% diff
3.80%
5.40%
0.00%
3.20%
1.60%
7.60%
0.00%
DEs!
0.998
1.258
1.279
1.326
1.419
1.475
1.513
% diff
2.10%
6.20%
0.00%
4.70%
2.20%
9.30%
0.00%
DEs!
1.068
1.285
1.28
1.328
1.43
1.496
1.543
% diff
9.10%
8.90%
0.10%
4.90%
3.30%
11.40%
3.00%
DEs!
1.062
1.285
1.284
1.34
1.443
1.509
1.547
% diff
8.50%
8.90%
0.50%
6.10%
4.60%
12.70%
3.40%
DEs!
1.062
1.303
1.286
1.351
1.442
1.522
1.551
% diff
8.50%
10.70%
0.70%
7.20%
4.50%
14.00%
3.80%
DEs!
1.072
1.309
1.303
1.362
1.45
1.535
1.558
% diff
9.50%
11.30%
2.40%
8.30%
5.30%
15.30%
4.50%
DEs!
1.072
1.309
1.303
1.362
1.45
1.535
1.558
% diff
9.50%
11.30%
2.40%
8.30%
5.30%
15.30%
4.50%
15.00%
13.00%
... //
Av. % diff
Wright
2
R DTarg
to DEs!
Target 0.00% 0.9981 0.29% 0.9853 1.90% 0.9736 3.09% 0.9633 3.50% 0.9453 5.81% 0.9449 6.39% 0.9315 7.06% 0.9336 8.09% 0.9336 8.09%
•
square
•
sejima
.,
Gray
X
VSB
o
leCorb.
•
Grid
+
Wright
•
L-----------------------~"7'...:..-------~
Poly. (square) --------.
Poly. (sejima)
_____ . Poly. (Gray) _.
Poly. (VSB)
---
10
20
30
40 Line Thickness
so
-
60
70
80
90
_ Poly. -
(t.e
Cor b.)
- Poly. (Grid) -
Poly. (Wright)
100
(points)
Figure 15 Results, impact of line thickness
13
ARCHITECTURE
SCIENCE. No.7. June 2013
When the complete set of line thickness results is considered
two
things
are
apparent.
First,
for
test images showed errors of over 6% magnitude for the
a
thicker permutations;
sufficiently large starting image (say, 1MB), as long as
values which are higher than for
the other factors considered in this paper.
the lines being analysed are very thin (less than l Opt in 4.4 Image Resolution this case), the impact on the results is negligible. Thus, the standard procedure of retracing every architectural elevation,
a time-consuming
analysis of the results of the image
may not be as
resolution test shows that the higher the resolution, the
critical as previously thought provided the software or
more convergent the results (Table 5). However, this is
computational method is powerful enough to examine a
not a clear linear trend, like that of the line thickness test,
much larger starting image. Second, once lines become
although it does broadly conform to the theorised ideal
marginally thicker, they have a heightened capacity to
standard (Fig 16). For this reason, the 175pdi version
produce quite substantial errors. In particular, five of the
was selected as the target. Moreover, there is another
Image Resolution
75 dpi
100 dpi
125 dpi
150 dpi
175 dpi
Square
process,
A preliminary
Table 5 Results of image resolution Le Sejima Gray VSB Corbo
analysis Grid
Wright
DEs!
0.953
1.169
1.226
1.230
1.343
1.353
1.465
%diff g-c
4.50%
5.00%
3.70%
3.6%
1.10%
0.60%
3.80%
14
14
14
17
16
14
12
o-:
0.998
1.178
1.213
1.273
1.34
1.376
1.51
%diff g-c
0.00%
4.10%
5.00%
0.70%
1.40%
2.90%
0.70%
15
15
15
17
17
15
12
DEs!
0.982
1.207
1.246
1.27
1.368
1.353
1.515
% diff
1.60%
1.20%
1.70%
0.40%
1.40%
0.60%
1.20%
g-c
16
15
15
18
17
16
13
DEs!
0.998
1.207
1.253
1.235
1.346
1.372
1.496
% diff
0.00%
1.20%
1.00%
3.10%
0.80%
2.50%
0.70%
g-c
16
16
16
19
18
16
14
o-;
0.998
1.219
1.263
1.266
1.354
1.347
1.503
% diff
0.00%
0.00%
0.00%
0.00%
0.00%
0.00%
0.00%
g-c
17
16
16
19
18
17
14
R2DTarg to
Av.
% diCf
DEs,
0.8414 2.20% 0.9715 1.80% 0.9974 0.90% 0.9886 1.60% 1.000 Target
•
square
•
Sejima
A
Gray
X
V58
o
le Corb.
•
Grid
+
Wright Poly. (square)
.__ ..- Poly. (5ejima) •.••••.
Poly. (Gray)
• - - -
Poly. (V58)
----
Poly.
- - -
Poly. (Grid)
-
75
100
125 Image Resolution
150 (dpi)
Figure 16 Results, impact ofImage
14
resolution
175
-
(le
Corb.)
- Poly. (Wright)
Limits and Errors: Optimising Image Pre-Processing Standards for Architectural Fractal Analysis
compelling rationale for choosing this target, the larger
However, when additional tests were undertaken using
the image, the more grid comparisons may be undertaken
the low resolutions
by the software, and the more statistically
viable the
resolutions up to 27Sdpi (Table 6), the program was not
result. Thus, for this factor test, an additional piece of
able to return results for all of the images. At the low
information,
resolutions, the images appeared blurry and the software
the number of grid comparisons
possible,
was also tabulated.
of SOdpi and 2Sdpi and higher
was unable to detect the full extent of the images at
Despite the results generally worsening with lower
SOdpi and in some cases, could not detect the image any
image resolutions, some of the indicators for the 12Sdpi
longer at 2Sdpi (shown as 'x' in Table 6). At the higher
permutation
resolutions, particularly 2S0dpi and 27Sdpi, the amount
are superficially
superior to those of the
ISOdpi version. The former has both a lower percentage
of information processing required was too high for the
difference and a higher R2 value (both suggesting a better
program and the calculations
result) although it always has a lower grid-comparison
(shown as 'xx' in Table 6). Thus, image resolution has a
value
clear upper and lower limit beyond which a result simply
than both the
lS0dpi
and the target
17Sdpi
permutations. However, as none of the results are below
could not be completed
cannot be produced.
the reduced error zone of I% (being 20% of the highest
5 Conclusion difference S), only the target value is considered to be the best option for resolution settings for image processing.
The tests conducted in this paper reveal that two of
Another potentially misleading part of this set of results
the pre-processing
options for images have clear trends;
is that, as a by-product of changing resolution, the errors
line thickness and image resolution. In both cases, even
range from 0.00% to ±2.S%, which might seem to
seemingly minor changes in image standards can result
indicate that resolution has little impact on the image.
in errors of up to ±9%; completely
undermining
the
Table 6 Complete results for Image resolution Image Resolution DEs!
25 dpi
Square
Sejima
Gray
VSB
Le Corbo
x
x
x
x
x
% diff
--
g-c
11
8
0.866
0.857
0.841
1.229
% diff
1805.00%
-86.70%
-71.50%
-86.60%
-85.70%
-83.60%
-122.50%
g-c
13
12
12
15
12
13
xx
1.357
1.501
1.00%
0.20%
17
17
14
1.351
1.339
1.493
0.40%
0.30%
0.80%
1.00%
17
19
18
15
1.264
0.70%
0.10%
g-c
17
17
17
DEs!
1.008
1.229
1.267
% diff
1.00%
1.00%
g-c DTa.,
18
17
% difl g-c
xx
1.037
1.222
1.274
1.352
1.499
3.90%
0.30%
1.10%
0.50%
0.40%
18
17
17
18
15
1.221
xx
xx
~ 275 dpi
1.343
1.212
0%
xx
xx
xx
xx
xx
0.20%
0.30%
b-e
18
15
-
51.47
181.20
0.52
0.75
1.24
1.506
% diff
---
Av.
% diff
10
l.l0%
0.998 % diff
--
250 dpi
1.014 48.90%
0.726
~
225 dpi
0.292 105.50%
0.87
--
200 dpi
Wright
-0.05
~ 50 dpi
Grid
0.25
IS
ARCHITECTURE
SCIENCE. No.7. June 2013
Table 7 Suggested settings (assuming an image size of between 2MB and 3MB at 17Sdpi) Variable White space
Reduced error zone 30-60% increase
Image position
Centre-Centre or C-C Centre-Base 1-30 Qoints 1 Qt 175dpi 175 dpi ___________
Line thickness Image resolution
veracity of fractal dimension
Optimal setting 40-50% increase
calculations
made using
in both cases
the use of
Notes A moderate (40-50%) amount of white space around a starting image produces the most consistent result. The ideal white space is determined by measuring the shortest axis of the image space, then calculating 40% or 50% of that length, and adding half of that amount to each side of the image to define a rectangular field. The more centred the image, the more consistent the results. The thinner the line, the better the result. The higher the resolution (relative to the size of t__ h_c_e_image) the better the result. _
Acknowledgements these
settings.
particular
However,
standards or settings identified in this paper
will limit possible errors to less than ±0.5%.
Discovery
The results for variations in white space and image position
are less compelling.
An ARC Fellowship
(FT0991309)
Grant (DP1094154)
and an ARC
supported the research
undertaken in this paper.
For the former case, a
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