# resizing 3D matrix (image) in MATLAB

I have a 3D matrix (MxNxK) and want to resize it to (M'xN'xK') (like imresize in matlab). I am using image pyramid, but its result is not very accurate and need a better one. Any solution?

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What is the difference between `M` and `M'`? The dimensions are supposed to be scalars. Ah, I see, these are not transpose operators –  Serg Sep 20 '12 at 21:16
@ Serg: there is no relationship, M' is just the smaller dimension which we want. –  Sam Sep 20 '12 at 21:18
How would you like to resize it? Nearest Neighbor? Bilinear? Bi-Cubic? –  Andrey Sep 20 '12 at 21:59
@ Andrey: The best method which can do it. Because the accuracy for me is very important. –  Sam Sep 20 '12 at 22:39

Here is the `resize` function we are using in the kWave toolbox.

``````function mat_rs = resize(varargin)
%RESIZE     Resize a matrix.

% DESCRIPTION:
%       Resize a matrix to a given size using interp2 (2D) or interp3
%       (3D).
%       Use interpolation to redivide the [0,1] interval into Nx, Ny, Nz
%       voxels, where 0 is the center of first voxel, and 1 is the center
%       of the last one.
%
% USAGE:
%       mat_rs = resize(mat, new_size)
%       mat_rs = resize(mat, new_size, interp_mode)
%
% INPUTS:
%       mat         - matrix to resize
%       new_size    - desired matrix size in elements given by [Nx, Ny] in
%                     2D and [Nx, Ny, Nz] in 3D. Here Nx is the number of
%                     elements in the row direction, Ny is the number of
%                     elements in the column direction, and Nz is the
%                     number of elements in the depth direction.
%
% OPTIONAL INPUTS:
%       interp_mode - interpolation mode used by interp2 and interp3
%                     (default = '*linear')
%
% OUTPUTS:
%       mat_rs      - resized matrix

% check the inputs for release B.0.2 compatability
if length(varargin{2}) == 1 && nargin >= 3 && length(varargin{3}) == 1

% display warning message
disp('WARNING: input usage deprecated, please see documentation.');
disp('In future releases this usage will no longer be functional.');

% recursively call resize with the correct inputs
if nargin == 3
mat_rs = resize(varargin{1}, [varargin{2}, varargin{3}]);
else
mat_rs = resize(varargin{1}, [varargin{2}, varargin{3}], varargin{4});
end
return

end

% update command line status
disp('Resizing matrix...');

% assign the matrix input
mat = varargin{1};

% check for interpolation mode input
if nargin == 2
interp_mode = '*linear';
elseif nargin ~= 3
error('incorrect number of inputs');
else
interp_mode = varargin{3};
end

% check inputs
if numDim(mat) ~= length(varargin{2})
error('resolution input must have the same number of elements as data dimensions');
end

switch numDim(mat)
case 2
% extract the original number of pixels from the size of the matrix
[Nx_input, Ny_input] = size(mat);

% extract the desired number of pixels
Nx_output = varargin{2}(1);
Ny_output = varargin{2}(2);

% update command line status
disp(['  input grid size: ' num2str(Nx_input) ' by ' num2str(Ny_input) ' elements']);
disp(['  output grid size: ' num2str(Nx_output) ' by ' num2str(Ny_output) ' elements']);

% check the size is different to the input size
if Nx_input ~= Nx_output || Ny_input ~= Ny_output

% resize the input matrix to the desired number of pixels
mat_rs = interp2(0:1/(Ny_input - 1):1, (0:1/(Nx_input - 1):1)', mat, 0:1/(Ny_output - 1):1, (0:1/(Nx_output - 1):1)', interp_mode);

else
mat_rs = mat;
end
case 3

% extract the original number of pixels from the size of the matrix
[Nx_input, Ny_input, Nz_input] = size(mat);

% extract the desired number of pixels
Nx_output = varargin{2}(1);
Ny_output = varargin{2}(2);
Nz_output = varargin{2}(3);

% update command line status
disp(['  input grid size: ' num2str(Nx_input) ' by ' num2str(Ny_input) ' by ' num2str(Nz_input) ' elements']);
disp(['  output grid size: ' num2str(Nx_output) ' by ' num2str(Ny_output) ' by ' num2str(Nz_output) ' elements']);

% create normalised plaid grids of current discretisation
[x_mat, y_mat, z_mat] = ndgrid((0:Nx_input-1)/(Nx_input-1), (0:Ny_input-1)/(Ny_input-1), (0:Nz_input-1)/(Nz_input-1));

% create plaid grids of desired discretisation
[x_mat_interp, y_mat_interp, z_mat_interp] = ndgrid((0:Nx_output-1)/(Nx_output-1), (0:Ny_output-1)/(Ny_output-1), (0:Nz_output-1)/(Nz_output-1));

% compute interpolation; for a matrix indexed as [M, N, P], the
% axis variables must be given in the order N, M, P
mat_rs = interp3(y_mat, x_mat, z_mat, mat, y_mat_interp, x_mat_interp, z_mat_interp, interp_mode);

otherwise
error('input matrix must be 2 or 3 dimensional');
end
``````
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@ Chaohung: I am not familiar with this toolbox, it can work with 3D matrix to resize it to a smaller one? which function of this toolbox should be added to matlab? –  Sam Sep 20 '12 at 22:37
Thanks for sharing this! I believe `numDim(.)` in the input sanity checks is not a standard matlab function. However it can be replaced with `ndims(.)`. After that the code worked perfectly. Cheers! –  Chrigi Aug 16 '13 at 20:28

You could use `interp3` (since you want to interpolate 3D data):

``````im=rand(2,3,4); %%% input image
ny=3;nx=3;nz=5; %% desired output dimensions
[y x z]=...
ndgrid(linspace(1,size(im,1),ny),...
linspace(1,size(im,2),nx),...
linspace(1,size(im,3),nz));
imOut=interp3(im,y,x,z);
``````
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@ Oli: it can be use for shrinking a matrix? making a matrix to be smaller –  Sam Sep 20 '12 at 22:35
Yes, it works. You can try :) –  Oli Sep 21 '12 at 0:40
@ Oli: But it produces some NaN value at the edge!! how I is that? –  Sam Sep 21 '12 at 3:18
I guess I mixed up the indices a bit. Look at the case 3 of chaohuang's answer for a better solution. –  Oli Sep 21 '12 at 17:07