# all combination of indices of vectors with different lengths in MATLAB

I have a 1-dimensional cell array Z. Each cell of Z contains a vector. For example:

``````Z{1} = [1 2];
Z{2} = [3 4 5];
Z{3} = [6];
...
Z{length(Z)} = [10 11 12 13];
``````

The sizes of those vectors are all different. What I want to do is to compare the sum of functions values of all possible combinations with one element from each Z{i}. That is I want to compare all the following combinations:

``````func(1) + func(3) + func(6) + ...
func(1) + func(4) + func(6) + ...
func(1) + func(5) + func(6) + ...
func(2) + func(3) + func(6) + ...
func(2) + func(4) + func(6) + ...
func(2) + func(5) + func(6) + ...
...
...
``````

and I want to know which combination yields the maximum.

How can I smartly do this? The smarter, the better. But I am also looking for any working code. The problem size will be small.

Note: The actual values used in this example, 1, 2, 3, 4, 5, 6, ... are just examples. They don't have any specific pattern.

-

Consider the following solution, it has a cycle but it does what you want linearly in time instead of exponentially.

Iteratively, the algorithm runs throughout all the rows of `Z` making all the possible paths among the entries of the row `Z{i}`. Nonetheless, each entry is parsed just once, thus you save complexity.

`````` N = 3;

Z = cell(1,N);

Z{1} = [1 2];
Z{2} = [3 4 5];
Z{3} = [6];

f = @(x) x.^2;  %% Test function

disp('init')
res = arrayfun(f,(Z{1}))     %% Init step. Image of Z{1}
for i = 2 : N
disp(i)      %% just to have an idea of where you are in the process
disp(res)

t = bsxfun(@plus,res,arrayfun(f,(Z{i}))')  %In a tensor way you build all
%the possible sum of the res and f(Z{i})
%making all paths.
res = reshape(t,1,[])                      %You put the tensor sum on a single
%row to be able to iterate.
disp('END step-------')
end
``````

test with squares

``````res =

46    53    62    49    56    65
``````

for instance `46 = 1^2 + 3^2 + 6^2`, `49 = 2^2 + 3^2 + 6^2`...

So far I am not sure you can avoid cycles completely. What I do here is dynamically constructing the solution adding one element of your cell at every iteration.

Tensor summation technique (`t = bsxfun(@plus,res,arrayfun(f,(Z{i}))')`) from this answer.

-
In this case, what I am looking for is: [1 3 6]^2, [1 4 6]^2, [1 5 6]^2, [2 3 6]^2, [2 4 6]^2, [2 5 6]^2. I think you did [1 2]^2, [3 4 5]^2, [6]^2. –  FEQ Nov 17 '12 at 18:00
Got you, every possible combination of those. OK –  Acorbe Nov 17 '12 at 18:02
@Chang, You may want to consider the answer now. –  Acorbe Nov 17 '12 at 18:29
@Chang, I added some comments. –  Acorbe Nov 17 '12 at 18:42
Thanks a lot! However, how do I know what combination yields the maximum of `res`? –  FEQ Nov 17 '12 at 18:48