# Matlab Blur Filter using Function

I'm trying to make a function in Matlab that blurs my image. I'm using Matlabs demo image `peppers.png`.

Here is my function:

``````    function g = myfilter(f, h)

f = double(f); %convert to double
g = zeros(size(f)); %new array (size of f)
a = (size(h, 1) - 1) / 2; %padding on edges

for row = (a + 1) : (size(f,1) - a)
for col = (a + 1) : (size(f,2) - a)

gxy = 0; %running sum

for m = -a:a
for n = -a:a

gxy = gxy + f(row - m, col - n) + h(m + a+1, n + a+1);
end
end

g(row, col) = gxy;
end
end

g = uint8(g); %convert back to int
``````

Here are my commands:

``````    >> img = imread('peppers.png');
>> imshow(img)
>> imgGray = rgb2gray(img);
>> imshow(imgGray)
>>
>> filt1 = (1/9)*ones(3)

filt1 =

0.1111    0.1111    0.1111
0.1111    0.1111    0.1111
0.1111    0.1111    0.1111

>> test = myfilter(imgGray, filt1);
>> imshow(test)
``````

It successfully converts the colour image to grey and applies the filter.

Unfortunately, the filter just creates a nearly complete white image (too bright)... I simply can not see why... It should be taking an average of each pixel using the 3x3 filter... Is anything obvious to you guys to why this is happening?

-

You need to see the conv2 function of MATLAB. The following function for 2D convolution has been extracted from conv2 and works great for your given filter.

``````function c = myfilter(a, b)
[ma, na] = size(a);
[mb, nb] = size(b);
c = zeros( ma+mb-1, na+nb-1 );
for i = 1:mb
for j = 1:nb
r1 = i;
r2 = r1 + ma - 1;
c1 = j;
c2 = c1 + na - 1;
c(r1:r2,c1:c2) = c(r1:r2,c1:c2) + b(i,j) * a;
end
end
c = uint8(c)
``````
-

Simple arithmetic typo.

`gxy = gxy + f(row-m, col-n) + h(m+a+1, n+a+1);`

Should be: `gxy = gxy + f(row-m, col-n) * h(m+a+1, n+a+1);`.

It works fine and now creates a blurry image.

Instead of multiplying `f` and `h`, they were being summed in the code above which does not conform to the spatial-domain image filter that is defined by a 2D convolution. Matlab was executing the function correctly, however introduced anomalies(or unexpected results) even though the filter functioned correctly with a different arithmetic operator.

Problem solved.

-