# neighborhood radius in an image

I have an image (200x200) and want to find the neighborhood locations in a specific point with a predefined radius. For example, with the radius of 5, I have 25 points around a point. Does MATLAB can do it? The problem is about the edge of image which it does not always 25 points and the program should just find the points that are within that radius. These points can be varied from 1 (corner) to 25 (center of image)

-
–  Amro Aug 8 '12 at 1:32

Here is an example:

``````%# sample grayscale image
[imgH,imgW,~] = size(img);

%# circle params
t = linspace(0, 2*pi, 50);   %# approximate circle with 50 points
c = [100 130];               %# center

BW = poly2mask(r*cos(t)+c(1), r*sin(t)+c(2), imgH, imgW);

%# show cropped image
imshow( immultiply(img,BW) )
axis on
``````

This will handle edges cases just fine. The advantage of using POLY2MASK is that it computes the mask with a sub-pixel accuracy (read the algorithm section in the function documentation), provided you are using enough points to approximate the circle.

-
if you dont have access to the image processing toolbox, you could do something similar using MESHGRID/NDGRID –  Amro Aug 8 '12 at 1:23
Thanks a lot Amro. Just two questions: 1)How I can change the circle to square and 2) If I have a 3D matrix, then what should I do? –  Sam Aug 8 '12 at 2:15
@Sam: 1) a square mask is simple: `mask = false(imgH,imgW); mask(100:200,100:200) = true;` 2) if you have an RGB image, you could simply replicate the mask along the third dimension `repmat(mask,[1 1 3])` (assuming all channels are masked the same, otherwise process each R,G,B channel separately then combine back with `cat(3,R,G,B)`) –  Amro Aug 8 '12 at 2:35
@ Amro: Actually I have a 3D matrix (100x100x50) and I want to find the location (or indices) of neighborhood of a point on that matrix. For example, if I consider a cubic as the desired neighborhood, then in the center I can say that my neighborhood are (i-size_of_cubic/2:i+size_of_cubic,j-size_of_cubic/2:j+size_of_cubic,k-size_of_c‌​ubic/2:k+size_of_cubic). I need a function that can do it for me and like your circle function can encounter with corners (in the corners I have just a quarter of cubic. Thanks for your help –  Sam Aug 8 '12 at 3:33
@Sam: since the question was tagged as image-processing, I assumed you were working with images. Also the "radius" got to me to think you wanted a circular neighborhood, but now I see that's not what you meant (an illustration would have been helpful)... Anyway, check out the following two answers, I think they should help (one is for the 2D case, the other for the 3D case): MATLAB moving a point in the XY plane, 3 dimensional matrices. –  Amro Aug 8 '12 at 16:07
show 1 more comment

Following the discussion in the comments, I am adding another solution. For a given point, we compute the neighboring points within a specified number of steps (radius if you will). This is shown for both the 2D and the 3D case.

# 2D matrix

``````siz = [10 15];                         %# matrix size
p = [5 10];                            %# 2D point location

%# neighboring points
k = 2;                                 %# radius size
[sx,sy] = ndgrid(-k:k,-k:k);           %# steps to get to neighbors
xy = bsxfun(@plus, p, [sx(:) sy(:)]);  %# add shift
xy = bsxfun(@min, max(xy,1), siz);     %# clamp coordinates within range
xy = unique(xy,'rows');                %# remove duplicates
xy(ismember(xy,p,'rows'),:) = [];      %# remove point itself

%# show solution
figure
line(p(1), p(2), 'Color','r', ...
'LineStyle','none', 'Marker','.', 'MarkerSize',50)
line(xy(:,1), xy(:,2), 'Color','b', ...
'LineStyle','none', 'Marker','.', 'MarkerSize',20)
grid on, box on, axis equal
axis([1 siz(1) 1 siz(2)])
xlabel x, ylabel y
``````

# 3D matrix

``````siz = [10 15 8];                              %# matrix size
p = [5 10 4];                                 %# 3D point location

%# neighboring points
k = 2;                                        %# radius size
[sx,sy,sz] = ndgrid(-k:k,-k:k,-k:k);          %# steps to get to neighbors
xyz = bsxfun(@plus, p, [sx(:) sy(:) sz(:)]);  %# add shift
xyz = bsxfun(@min, max(xyz,1), siz);          %# clamp coordinates within range
xyz = unique(xyz,'rows');                     %# remove duplicates
xyz(ismember(xyz,p,'rows'),:) = [];           %# remove point itself

%# show solution
figure
line(p(1), p(2), p(3), 'Color','r', ...
'LineStyle','none', 'Marker','.', 'MarkerSize',50)
line(xyz(:,1), xyz(:,2), xyz(:,3), 'Color','b', ...
'LineStyle','none', 'Marker','.', 'MarkerSize',20)
view(3), grid on, box on, axis equal
axis([1 siz(1) 1 siz(2) 1 siz(3)])
xlabel x, ylabel y, zlabel z
``````

HTH

-
THANKS A LOT Amro :) for your great help. –  Sam Aug 10 '12 at 4:57