1

I need to generate the complete set of combinations obtained combining three different subset:

  • Set 1: choosing any 4 numbers from a vector of 13 elements.
  • Set 2: choosing any 2 numbers from a vector of 3 elements.
  • Set 3: choosing any 2 numbers from a vector of 9 elements.

Example: sample 3 from vector of 4 (H=3 and L=4) for the Set A, H=2 L=3 for the Set B and H=2 L=4 for the Set B:

           4    4   4
           3    4   4
           3    3   4
           3    3   3
           2    4   4
           2    3   4
           2    3   3
           2    2   4
Set A =    2    2   3
           2    2   2
           1    4   4
           1    3   4
           1    3   3
           1    2   4
           1    2   3
           1    2   2
           1    1   4
           1    1   3
           1    1   2
           1    1   1

           3    3
           2    3
Set B =    2    2
           1    3
           1    2
           1    1

           4    4
           3    4
           3    3
           2    4
Set C =    2    3
           2    2
           1    4
           1    3
           1    2
           1    1

[Set A] = [20 x 3], [Set B] = [6 x 2], [Set C] = [10 x 2]. Then I need to obtain all possible combinations from these three sets: AllComb = [Set A] x [Set B] x [Set C] = [1200 x 8]. The AllComb matrix will be like this:

4   4   4   |   3   3   |   4   4
4   4   4   |   3   3   |   3   4
4   4   4   |   3   3   |   3   3
4   4   4   |   3   3   |   2   4
4   4   4   |   3   3   |   2   3
4   4   4   |   3   3   |   2   2
4   4   4   |   3   3   |   1   4
4   4   4   |   3   3   |   1   3
4   4   4   |   3   3   |   1   2
4   4   4   |   3   3   |   1   1
4   4   4   |   2   3   |   4   4
4   4   4   |   2   3   |   3   4
4   4   4   |   2   3   |   3   3
4   4   4   |   2   3   |   2   4
4   4   4   |   2   3   |   2   3
                 .
                 .
                 .
1   1   1   |   1   1   |   1   1

Unfortunately I can not use the same number for the sets since I need to substitute the numbers like that:

  • For Set A: 1 = 10, 2 = 25, 3 = 30 and 4 = 45
  • For Set B: 1 = 5, 2 = 20 and 3 = 35
  • For Set C: 1 = 10, 2 = 20, 3 = 30 and 4 = 50

Any ideas? Real case sets will often lead to an AllComb matrix ~[491 400 x 8] so vectorized solutions will be gladly accepted.

Note: Each set is obtained with the following code:

a = combnk(1:H+L-1, H);
b = cumsum([a(:,1)  diff(a,[],2) - 1],2);

What is H and L?

H are the hoppers of a MultiheadWeigher (MHW) machines. I have a MHW with H=8 and I need to deliver in each of these hoppers some materials. If I need to deliver just one type of material all possibile combinations are (L+H-1)!/(H!(L-1)!) and i compute them with the code write above (a and b). Now, suppose to have 3 different product then we have 4 hoppers for product A, 2 for B and 2 for C. Product A in the first 4 hoppers can assume values 10:10:130, Product B 10:10:30 and c 10:10:90. Then the number of steps are for A L=13, B L=3 and C L=9

13
  • I don't seem to understand your question: You have 3 vectors with 13,3,9 elements respectively. Then you take 4,2,2random elements of these vectors (which result in "reduced" vectors) and with those elements you construct Set A,B,C which either have all permutations of 3 or 2 of those "reduced" vectors. And you got code for constructing the sets. What is your questions?
    – The Minion
    Jun 17, 2014 at 8:42
  • I might be thick but what is the difference between this question and the question you asked yesterday? stackoverflow.com/q/24239505/2545927
    – kkuilla
    Jun 17, 2014 at 8:43
  • 1
    @kkuilla That question is about How to handle a huge single set matrix :)
    – gmeroni
    Jun 17, 2014 at 8:51
  • @TheMinion Right now i have the code just to build a single set. I do not know how to combining them properly in order to obtain AllComb
    – gmeroni
    Jun 17, 2014 at 8:52
  • SO you are able to compute the 3 Sets, where each row contains one possibility? And now you want to permutate over all those possibilities from 3 Sets?
    – The Minion
    Jun 17, 2014 at 8:53

2 Answers 2

1

You basically need to find

  1. Combinations with repetition for each set;
  2. "Multi-variations" (I don't know the correct name for this) of the results of stage 1.

Both stages can be solved with more or less the same logic, taken from here.

%// Stage 1, set A
LA = 4;
HA = 3;
SetA = cell(1,HA);
[SetA{:}] = ndgrid(1:LA);
SetA = cat(HA+1, SetA{:});
SetA = reshape(SetA,[],HA);
SetA = unique(sort(SetA(:,1:HA),2),'rows');

%// Stage 1, set B
LB = 3;
HB = 2;
SetB = cell(1,HB);
[SetB{:}] = ndgrid(1:LB);
SetB = cat(HB+1, SetB{:});
SetB = reshape(SetB,[],HB);
SetB = unique(sort(SetB(:,1:HB),2),'rows');

%// Stage 1, set C
LC = 4;
HC = 2;
SetC = cell(1,HC);
[SetC{:}] = ndgrid(1:LC);
SetC = cat(HC+1, SetC{:});
SetC = reshape(SetC,[],HC);
SetC = unique(sort(SetC(:,1:HC),2),'rows');

%// Stage 2
L = 3; %// number of sets
result = cell(1,L);
[result{:}] = ndgrid(1:size(SetA,1),1:size(SetB,1),1:size(SetC,1));
result = cat(L+1, result{:});
result = reshape(result,[],L);
result = [ SetA(result(:,1),:) SetB(result(:,2),:) SetC(result(:,3),:) ];
result = flipud(sortrows(result)); %// put into desired order

This gives

result =
     4     4     4     3     3     4     4
     4     4     4     3     3     3     4
     4     4     4     3     3     3     3
     4     4     4     3     3     2     4
     4     4     4     3     3     2     3
     4     4     4     3     3     2     2
     4     4     4     3     3     1     4
     4     4     4     3     3     1     3
     4     4     4     3     3     1     2
     4     4     4     3     3     1     1
     4     4     4     2     3     4     4
     4     4     4     2     3     3     4
     4     4     4     2     3     3     3
     4     4     4     2     3     2     4
     4     4     4     2     3     2     3
     4     4     4     2     3     2     2
     4     4     4     2     3     1     4
     4     4     4     2     3     1     3
     4     4     4     2     3     1     2
     ...        
1
  • Nice!! I added some lines to substitute the results values with the real ones for each product (= set)!
    – gmeroni
    Jun 17, 2014 at 12:32
1

I guess this could be further optimized but this generates you AllComb:

H=3;
L=4;
a = combnk(1:H+L-1, H);
b = cumsum([a(:,1)  diff(a,[],2) - 1],2);
H=2;
L=3;
c = combnk(1:H+L-1, H);
d = cumsum([c(:,1)  diff(c,[],2) - 1],2);
H=2;
L=4;
e = combnk(1:H+L-1, H);
f = cumsum([e(:,1)  diff(e,[],2) - 1],2);
u=[];
for k=1:10
u=vertcat(u,d);
end
u=sortrows(u,[1 2]);
v=[];
for k=1:6
v= vertcat(v,f);
end
w= [u,v];
v=[];
for k=1:20
 v= vertcat(v,w);
end
u=[];
for k=1:60
 u = vertcat(u,b);
end
u=sortrows(u,[1 2 3]);
AllComb= [u,v];

Here b,d and f are your 3 sets. Then i loop over the numbers of permutation in d and f and replicate them so that all possibilities are constructed. One of them is sorted and then i write them in a new matrix w. THis process is repeated with Set A (b) and this new constructed matrix. Resulting in the end in AllComb.

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