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Suppose I have an NxN matrix A, an index vector V consisting of a subset of the numbers 1:N, and a value K, and I want to do this:

 for i = V
     A(i,i) = K
 end

Is there a way to do this in one statement w/ vectorization?

e.g. A(something) = K

The statement A(V,V) = K will not work, it assigns off-diagonal elements, and this is not what I want. e.g.:

>> A = zeros(5);
>> V = [1 3 4];
>> A(V,V) = 1

A =

 1     0     1     1     0
 0     0     0     0     0
 1     0     1     1     0
 1     0     1     1     0
 0     0     0     0     0
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5 Answers 5

up vote 30 down vote accepted

I usually use EYE for that:

A = magic(4)
A(logical(eye(size(A)))) = 99

A =
    99     2     3    13
     5    99    10     8
     9     7    99    12
     4    14    15    99

Alternatively, you can just create the list of linear indices, since from one diagonal element to the next, it takes nRows+1 steps:

[nRows,nCols] = size(A);
A(1:(nRows+1):nRows*nCols) = 101
A =
   101     2     3    13
     5   101    10     8
     9     7   101    12
     4    14    15   101

If you only want to access a subset of diagonal elements, you need to create a list of diagonal indices:

subsetIdx = [1 3];
diagonalIdx = (subsetIdx-1) * (nRows + 1) + 1;
A(diagonalIdx) = 203
A =
   203     2     3    13
     5   101    10     8
     9     7   203    12
     4    14    15   101

Alternatively, you can create a logical index array using diag (works only for square arrays)

diagonalIdx = false(nRows,1);
diagonalIdx(subsetIdx) = true;
A(diag(diagonalIdx)) = -1
A =
    -1     2     3    13
     5   101    10     8
     9     7    -1    12
     4    14    15   101
share|improve this answer
    
cool, it works! will accept when the stupid-timer runs out –  Jason S Oct 18 '10 at 21:33
    
@Jason S: Thanks! I actually find this an annoying issue; I often attempt to use diag first, before I remember to use eye –  Jonas Oct 18 '10 at 21:37
>> tt = zeros(5,5)
tt =
     0     0     0     0     0
     0     0     0     0     0
     0     0     0     0     0
     0     0     0     0     0
     0     0     0     0     0
>> tt(1:6:end) = 3
tt =
     3     0     0     0     0
     0     3     0     0     0
     0     0     3     0     0
     0     0     0     3     0
     0     0     0     0     3

and more general:

>> V=[1 2 5]; N=5;
>> tt = zeros(N,N);
>> tt((N+1)*(V-1)+1) = 3
tt =
     3     0     0     0     0
     0     3     0     0     0
     0     0     0     0     0
     0     0     0     0     0
     0     0     0     0     3

This is based on the fact that matrices can be accessed as one-dimensional arrays (vectors), where the 2 indices (m,n) are replaced by a linear mapping m*N+n.

share|improve this answer
    
I only saw your solution after I had submitted my edit. +1 for being faster, even though my solution is a bit more general :) –  Jonas Oct 18 '10 at 21:36
    
I really like the tt(1:n+1:end) method, really clean! –  Erika Dec 23 at 8:04
A = zeros(7,6);
V = [1 3 5];

[n m] = size(A);
diagIdx = 1:n+1:n*m;
A( diagIdx(V) ) = 1

A =
     1     0     0     0     0     0
     0     0     0     0     0     0
     0     0     1     0     0     0
     0     0     0     0     0     0
     0     0     0     0     1     0
     0     0     0     0     0     0
     0     0     0     0     0     0
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Suppose K is the value

A=A-diag(K-diag(A))

may be a bit faster

A=randn(10000,10000);

tic;A(logical(eye(size(A))))=12;toc

Elapsed time is 0.517575 seconds.

tic;A=A+diag((99-diag(A)));toc

Elapsed time is 0.353408 seconds.

but consumes more memory.

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I used A(logical(eye(size(A))))=K flexible fast and reliable –  Vass Mar 15 '13 at 11:59

I'd use sub2ind and pass the diagonal indices as both x and y parameters:

A = zeros(4)
V=[2 4]

idx = sub2ind(size(A), V,V)
% idx = [6, 16]

A(idx) = 1

% A =
% 0     0     0     0
% 0     1     0     0
% 0     0     0     0
% 0     0     0     1
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