# How can I generate the following matrix in MATLAB?

I want to generate a matrix that is "stairsteppy" from a vector.

Example input vector: `[8 12 17]`

Example output matrix:

``````[1 1 1 1 1 1 1 1 0 0 0 0 0 0 0 0 0]
[0 0 0 0 0 0 0 0 1 1 1 1 0 0 0 0 0]
[0 0 0 0 0 0 0 0 0 0 0 0 1 1 1 1 1]
``````

Is there an easier (or built-in) way to do this than the following?:

``````function M = stairstep(v)
M = zeros(length(v),max(v));
v2 = [0 v];
for i = 1:length(v)
M(i,(v2(i)+1):v2(i+1)) = 1;
end
``````
-
Looks like youve got it working, is there a problem here? – Karl Dec 14 '09 at 21:24
If you're asking for a built-in function I'm pretty sure there isn't one. What don't you like about your working code? – John D. Dec 14 '09 at 21:26
@Karl: He probably wants to vectorize it. – Jacob Dec 14 '09 at 21:26
vectorize = good; using a built-in function is even better! – Jason S Dec 14 '09 at 22:34
Sometimes I ask questions even though I have a solution that is OK -- always trying to hone my skills. – Jason S Dec 14 '09 at 22:37

There's no built-in function I know of to do this, but here's one vectorized solution:

``````v = [8 12 17];
N = numel(v);
M = zeros(N,max(v));
M([0 v(1:N-1)]*N+(1:N)) = 1;
M(v(1:N-1)*N+(1:N-1)) = -1;
M = cumsum(M,2);
``````

EDIT: I like the idea that Jonas had to use BLKDIAG. I couldn't help playing with the idea a bit until I shortened it further (using MAT2CELL instead of ARRAYFUN):

``````C = mat2cell(ones(1,max(v)),1,diff([0 v]));
M = blkdiag(C{:});
``````
-

You can do this via indexing.

``````A = eye(3);
B  = A(:,[zeros(1,8)+1, zeros(1,4)+2, zeros(1,5)+3])
``````
-
weird... will have to study this one. – Jason S Dec 15 '09 at 13:43

Here's a solution without explicit loops:

``````function M = stairstep(v)
L = length(v); % M will be
V = max(v);    %   an  L x V matrix

M = zeros(L, V);

% create indices to set to one
idx = zeros(1, V);
idx(v + 1) = 1;
idx = cumsum(idx) + 1;
idx = sub2ind(size(M), idx(1:V), 1:V);

% update the output matrix
M(idx) = 1;
``````

EDIT: fixed bug :p

-
+1: Very clever performing the CUMSUM on the index (as opposed to the final matrix), although for the sake of clarity `idx` should be initialized as `zeros(1,V+1)` to show that it actually ends up that size due to the subsequent line. – gnovice Dec 15 '09 at 2:57

A very short version of a vectorized solution

``````function out = stairstep(v)

% create lists of ones
oneCell = arrayfun(@(x)ones(1,x),diff([0,v]),'UniformOutput',false);
% create output
out = blkdiag(oneCell{:});
``````
-
Clever use of BLKDIAG, but you need to use something like `diff([0 v])` instead of `v` in the call to ARRAYFUN. – gnovice Dec 16 '09 at 3:25
Thanks for spotting this, gnovice. I really should have had a closer look at the question. – Jonas Dec 16 '09 at 13:21

You can use `ones` to define the places where you have 1's:

http://www.mathworks.com/help/techdoc/ref/ones.html

-
hmm, I don't think that'll work... isn't ones just a function that returns a matrix of all 1's? – Jason S Dec 14 '09 at 22:35
Right but I think you can set a submatrix of your matrix to that all-1s vector. Might be cleaner than setting 1 explicitly to each element. Anyway YMMV. – John Dec 14 '09 at 22:46