How to select a submatrix (not in any pattern) in Matlab? For example, for a matrix of size 10 by 10, how to select the submatrix consisting of intersection of the 1st 2nd and 9th rows and the 4th and 6th columns?
Thanks for any helpful answers!
As for your question, suppose you have an arbitrary 10-by-10 matrix A
. The simplest way to extract the desired sub-matrix would be with an index vector:
B = A([1 2 9], [4 6]);
There's an interesting article in the official documentation that comprehensively explains indexing in MATLAB. Basically, there are several ways to extract a subset of values, I'll summarize them for you:
Indexing vectors indicate the indices of the element to be extracted. They can either contain a single index or several, like so:
A = [10 20 30 40 50 60 70 80 90]
%# Extracts the third and the ninth element
B = A([3 9]) %# B = [30 90]
Indexing vectors can be specified for each dimension separately, for instance:
A = [10 20 30; 40 50 60; 70 80 90];
%# Extract the first and third rows, and the first and second columns
B = A([1 3], [1 2]) %# B = [10 30; 40 60]
There are also two special subscripts: end
and the colon (:
):
end
simply indicates the last index in that dimension.For example, instead of writing A([1 2 3], [2 3])
, you can write A(:, 2:end)
. This is especially useful for large matrices.
Linear indexing treats any matrix as if it were a column vector by concatenating the columns into one column vector and assigning indices to the elements respectively. For instance, we have:
A = [10 20 30; 40 50 60; 70 80 90];
and we want to compute b = A(2)
. The equivalent column vector is:
A = [10;
40;
70;
20;
50;
80;
30;
60;
90]
and thus b
equals 40.
The special colon and end
subscripts are also allowed, of course. For that reason, A(:)
converts any matrix A
into a column vector.
Linear indexing with matrix subscripts:
It is also possible to use another matrix for linear indexing. The subscript matrix is simply converted into a column vector, and used for linear indexing. The resulting matrix is, however always of the same dimensions as the subscript matrix.
For instance, if I = [1 3; 1 2]
, then A(I)
is the same as writing reshape(A(I(:)), size(I))
.
Converting from matrix subscripts to linear indices and vice versa:
For that you have sub2ind
and ind2sub
, respectively. For example, if you want to convert the subscripts [1, 3]
in matrix A
(corresponding to element 30) into a linear index, you can write sub2ind(size(A), 1, 3)
(the result in this case should be 7, of course).
In logical indexing the subscripts are binary, where a logical 1
indicates that the corresponding element is selected, and 0
means it is not. The subscript vector must be either of the same dimensions as the original matrix or a vector with the same number of elements. For instance, if we have:
A = [10 20 30; 40 50 60; 70 80 90];
and we want to extract A([1 3], [1 2])
using logical indexing, we can do either this:
Ir = logical([1 1 0]);
Ic = logical([1 0 1]);
B = A(Ir, Ic)
or this:
I = logical([1 0 1; 1 0 1; 0 0 0]);
B = A(I)
or this:
I = logical([1 1 0 0 0 0 1 1 0]);
B = A(I)
Note that in the latter two cases is a one-dimensional vector, and should be reshaped back into a matrix if necessary (for example, using reshape
).
Let me explain with an example:
Let's define a 6x6 matrix
A = magic(6)
A =
35 1 6 26 19 24
3 32 7 21 23 25
31 9 2 22 27 20
8 28 33 17 10 15
30 5 34 12 14 16
4 36 29 13 18 11
From this matrix you want the elements in rows 1, 2 and 5, and in the columns 4 and 6
B = A([1 2 5],[4 6])
B =
26 24
21 25
12 16
Hope this helps.
function f = sub(A,i,j)
[m,n] = size(A);
row = 1:m;
col = 1:n;
x = row;
x(i) = [];
y=col;
y(j) = [];
f= A(x,y);
Returns the matrix A, with the ith row and jth column removed.