I want to use Gurobi solver in Matlab, but I don't know how to calculate the required matrices (qrow and qcol).
For your reference I am copying the example provided in documentation.
0.5 x^2 - xy + y^2 - 2x - 6y
x + y <= 2 -x + 2y <= 2, 2x + y <= 3, x >= 0, y >= 0 c = [-2 -6]; % objective linear term objtype = 1; % minimization A = sparse([1 1; -1 2; 2 1]); % constraint coefficients b = [2; 2; 3]; % constraint right-hand side lb = ; % [ ] means 0 lower bound ub = ; % [ ] means inf upper bound contypes = '$<< vtypes = [ ]; % [ ] means all variables are continuous QP.qrow = int32([0 0 1]); % indices of x, x, y as in (0.5 x^2 - xy + y^2); use int64 if sizeof(int) is 8 for you system QP.qcol = int32([0 1 1]); % indices of x, y, y as in (0.5 x^2 - xy + y^2); use int64 if sizeof(int) is 8 for you system QP.qval = [0.5 -1 1]; % coefficients of (0.5 x^2 - xy + y^2)
Does it mean that if I have 4 decision variables than i should use 0,1,2,3 as indices for my decision variables x_1, x_2, x_3, x_4.?
Note: I tried to use mathurl.com but I don't get how to write in proper format show that it will appear as latex text. Sorry for the notation.