Trying to understand how to manipulate two matrices having the following elements (i ll try to simplify my problem so to be easier to answer) by expanding my previous question:
First matrix:
8 2 5
Mat1 = [ 3 7 8 ]
6 5 0
Second matrix:
Value(Mat1(1)) Value(Mat1(4)) Value(Mat1(7))
Mat2 = [ Value(Mat1(2)) Value(Mat1(5)) Value(Mat1(8)) ]
Value(Mat1(3)) Value(Mat1(6)) Value(Mat1(9))
Let's presume that Second matrix Values are:
18 22 47
Val.Mat2 = [ 28 84 82 ]
56 65 0
Now we cumsum values of Val.Mat2: VM2CS = cumsum(sort(Val.Mat2))
, and set a summarize constrain per column cstr = 100;
with constrain's results gathered on matrix: result = sum(VM2CS <= cnstrn);
18 22 0
VM2CS = 46 87 47
102 171 129
result = 2 2 2
######################## THE PROBLEM (two aspects with ascending complexity) #################
- Aspect one: How cumsum can ignore elements of zero(0); So result to be:
result = 2 2 1
. I 've tried:result = sum(cumsum(sort(VM2CS))<=cstr ~=0)
without success. - Aspect two:
Mat1
elements are repeated withinMat2
matrix (p.e. Mat1(1) element is the same as Mat1(8) with different value, 18 and 82 respectively. Mat1(6) and Mat1(7) are repeated too.). How can i use only once same element on the final result with perspective to have as many uniques elements per row (with zero(0) excluded)? Expected result should be:
18 22 47 result_expected = [ 28 54 0 ] 0 0 0
I know that aspect two isn't easy to be answered but pointing out to the solution should also be helpfull. Same useful examples have been proposed by Prof. Thomas G. Robertazzi on Planning Telecommunication Networks but I don't have this book in my possession now and I can't afford to buy it.