# Simplifying for loop (matlab)

I am working on a program at work to calculate what a plane could see as it fly's over a target area. As it goes over the area it could follow one of many tracks, around 100 for the normal area size. I have created a large loop to see if the plane can see parts of the area or not but it runs very inefficiently. I have defined the area as a grid 1001x1001

xgrid a variable 1001x1 defining the x-values.

thelines is a variable 2 x 1001 x tracks, where the first row is the y-values at the corresponding x-value for the top line. The second row is the y-values for the bottom line.

Between these two lines is the visible area. If it can be seen it marks the point on seenarea(1001x1001) as a 1. If not its a 0.

``````for M=1:tracks
for f=1:1001
for i=1:1001
if xgrid(f,1)>thelines(i,1,M) && xgrid(f,1)<thelines(i,2,M);
seenarea(f,i,M)=1; % This indicated the area has been seen
else
seenarea(f,i,M)=0; % This is not seen
end
end
end
fullbestinfo(1,M)={seenarea(:,:,M)}; % This stores the seen area in another cell
if max(seenarea(:,:,M)) < 1 % No area seen, stop
seenarea(:,:,M)=[];
break
end
end
``````

I have identified this point at the bottleneck of my program using the matlab profiler. Any help would be much appreciated. Thanks, Rich

-

I can't quite tell exactly what you're trying to do, but I suggest as a first step replacing the inner loops with logical indexing.

``````seenarea = false(1001, 1001, tracks); #% preallocate matrix to 'false'
xgrid = repmat(1:1001, 1001, 1); #%same size as the first 2D of seenarea

for M=1:tracks
border1 = thelines(:,ones(1,1001),M); #% same size as xgrid
border2 = thelines(:,ones(1,1001)*2,M); #% same size as xgrid
idx = xgrid > border1 & xgrid < border2; #% idx is a "logical index"
#%           ^--- single ampersand
seenarea(idx,M)=true;
end
``````

Using logical indexing, you can replace the million or so iterations of your nested loops with a single operation.

Here's another tip: Use a logical matrix instead of a double matrix to store true/false values.

``````>>m1 = zeros(1001,1001,100);
>> m2 = false(1001,1001,100);
>> whos m1
Name         Size                      Bytes  Class     Attributes

m1        1001x1001x100            801600800  double

>> whos m2
Name         Size                      Bytes  Class      Attributes

m2        1001x1001x100            100200100  logical
``````

As you can see, the memory usage is 8 times lower for the logical matrix.

Speed test: I was curious just how large a difference this would make. Below is a quick test (well, quick only for one of the implementations). Vectorizing the inner loops led to a roughly 75-fold increase in speed on my machine, decreasing the time for 10 tracks from 7+ seconds to roughly 0.1 seconds.

``````tic;
for rep=1:100
for M=1:tracks
for f=1:1001
for i=1:1001
if xgrid(f,1)>thelines(i,1,M) && xgrid(f,1)<thelines(i,2,M);
seenarea(f,i,M)=1;
else
seenarea(f,i,M)=0;
end
end
end
end
end
disp(toc/100)
7.3459

tic;
for rep=1:100
for M=1:tracks
border1 = thelines(:,ones(1,1001),M);
border2 = thelines(:,ones(1,1001)*2,M);
idx = xgrid > border1 & xgrid < border2;
seenarea(idx,M)=true;
end
end
disp(toc/100)
0.0964

>> 7.3459/.0964
ans =
76.2023
``````
-
There's a slight bug: You define variable `idx` for logical addressing, but after that you use unexisting variable `index` for addressing `seenarea`. – nrz Jun 11 '12 at 22:41
Fixed, thanks @nrz – tmpearce Jun 11 '12 at 22:43
... and another +1 for patience :) – Eitan T Jun 12 '12 at 7:15