How do I convert a 2X2 matrix to 4X4 matrix in MATLAB?

I need some help in converting a 2X2 matrix to a 4X4 matrix in the following manner:

``````A = [2 6;
8 4]
``````

should become:

``````B = [2 2 6 6;
2 2 6 6;
8 8 4 4;
8 8 4 4]
``````

How would I do this?

-
Thanks to all u guys. Problem solved. –  anubhav Oct 29 '09 at 14:25

``````A = [2 6; 8 4];
% arbitrary 2x2 input matrix

B = repmat(A,2,2);
% replicates rows & columns but not in the way you want

B = B([1 3 2 4], :);
% swaps rows 2 and 3

B = B(:, [1 3 2 4]);
% swaps columns 2 and 3, and you're done!
``````
-
Wow. That was a simple and good answer. Thanks –  anubhav Oct 29 '09 at 13:39
Nice! I thought there should be some way to do this with repmat and column and row swapping, but my brain is still half-asleep. –  las3rjock Oct 29 '09 at 13:42
Solution by gnovice using Kroneker KRON function is better - it is more straightforward and clear - "intentional programming" –  Mikhail Oct 30 '09 at 7:55
I like Martijn's answer better but that's just me. –  Jason S Oct 30 '09 at 13:06
With respect to all the indexing-based solutions, I actually prefer Edric's (which is a generalized form of las3rjock's edit). –  gnovice Oct 30 '09 at 15:33

Here's an even shorter solution which uses the MATLAB functions KRON and ONES:

``````>> A = [2 6; 8 4];
>> B = kron(A,ones(2))

B =

2     2     6     6
2     2     6     6
8     8     4     4
8     8     4     4
``````
-
shorter, although for generalization to large matrices, there's unnecessary multiplication that may slow things down. –  Jason S Oct 29 '09 at 14:17
@Jason S: True, but for larger matrices you would also have to do quite a bit more work in generating the indices needed by the other solutions here. –  gnovice Oct 29 '09 at 14:26

Can be done even easier than Jason's solution:

``````B = A([1 1 2 2], :);  % replicate the rows
B = B(:, [1 1 2 2]);  % replicate the columns
``````
-
:p :-) ......... –  Jason S Oct 29 '09 at 13:38
this answer is better! –  Jason S Oct 29 '09 at 13:39
One-liner: A = [2 6; 8 4]; B = A([1 1 2 2], [1 1 2 2]); –  las3rjock Oct 29 '09 at 13:49

Here's one more solution:

``````A = [2 6; 8 4];
B = A( ceil( 0.5:0.5:end ), ceil( 0.5:0.5:end ) );
``````

which uses indexing to do everything and doesn't rely on the size or shape of A.

-
that is bizarre! somehow the "end" keyword knows about matrix A even though it's an argument to ceil(). I have no idea how that works but it does. –  Jason S Oct 29 '09 at 14:15
I have no idea how it does it either, but it's handy! –  Edric Oct 29 '09 at 15:10
crazy, ugly and the most beautiful solution at the same time –  Mikhail Oct 30 '09 at 18:03

This works:

``````A = [2 6; 8 4];
[X,Y] = meshgrid(1:2);
[XI,YI] = meshgrid(0.5:0.5:2);
B = interp2(X,Y,A,XI,YI,'nearest');
``````

This is just two-dimensional nearest-neighbor interpolation of A(x,y) from x,y ∈ {1,2} to x,y ∈ {0.5, 1, 1.5, 2}.

Edit: Springboarding off of Jason S and Martijn's solutions, I think this is probably the shortest and clearest solution:

``````A = [2 6; 8 4];
B = A([1 1 2 2], [1 1 2 2]);
``````
-
will this work for any generic 2X2 matrix or is only specific to this 2X2 matrix. –  anubhav Oct 29 '09 at 13:24
This will work for any generic 2x2 matrix. –  las3rjock Oct 29 '09 at 13:27
great. it works. thanks –  anubhav Oct 29 '09 at 13:35

Here's a method based on simple indexing that works for an arbitrary matrix. We want each element to be expanded to an MxN submatrix:

``````A(repmat(1:end,[M 1]),repmat(1:end,[N 1]))
``````

Example:

``````>> A=reshape(1:6,[2,3])

A =

1     3     5
2     4     6

>> A(repmat(1:end,[3 1]),repmat(1:end,[4 1]))

ans =

1     1     1     1     3     3     3     3     5     5     5     5
1     1     1     1     3     3     3     3     5     5     5     5
1     1     1     1     3     3     3     3     5     5     5     5
2     2     2     2     4     4     4     4     6     6     6     6
2     2     2     2     4     4     4     4     6     6     6     6
2     2     2     2     4     4     4     4     6     6     6     6
``````

To see how the method works, let's take a closer look at the indexing. We start with a simple row vector of consecutive numbers

``````>> m=3; 1:m

ans =

1     2     3
``````

Next, we extend it to a matrix, by repeating it M times in the first dimension

``````>> M=4; I=repmat(1:m,[M 1])

I =

1     2     3
1     2     3
1     2     3
1     2     3
``````

If we use a matrix to index an array, then the matrix elements are used consecutively in the standard Matlab order:

``````>> I(:)

ans =

1
1
1
1
2
2
2
2
3
3
3
3
``````

Finally, when indexing an array, the 'end' keyword evaluates to the size of the array in the corresponding dimension. As a result, in the example the following are equivalent:

``````>> A(repmat(1:end,[3 1]),repmat(1:end,[4 1]))
>> A(repmat(1:2,[3 1]),repmat(1:3,[4 1]))
>> A(repmat([1 2],[3 1]),repmat([1 2 3],[4 1]))
>> A([1 2;1 2;1 2],[1 2 3;1 2 3;1 2 3;1 2 3])
>> A([1 1 1 2 2 2],[1 1 1 1 2 2 2 2 3 3 3 3])
``````
-

There is a Reshape() function that allows you to do this...

For example:

``````reshape(array, [64, 16])
``````

And you can find a great video tutorial here

Cheers

-
reshape will not work for this--it requires that the input and output matrices have the same number of elements. –  las3rjock Oct 29 '09 at 13:06
thanks for a quick one but i think for reshape the number of elements must not change. Here i have a 2X2 matrix ie 4 elements and i want to make a 4X4 matrix so 16 elements.No of elements are different. Wat to do? –  anubhav Oct 29 '09 at 13:07
Are you desiring the 'Reshape' process to add relevant element data in the newly-created space? –  Anthony M. Powers Oct 29 '09 at 13:56