How can I solve non concave quadratic function in matlab with constraints. I tried using quadprog but it doesn't work
I have to optimize a function f=x'Ax with constraints that sum of xs is equal to 1 and 0<=x<=1. My function is not concave. So I just need to maximize. It's ok if I find a local maxima even though global would be better.
I tried using matlab's quadprog function. However, it's results are not that good. I don't know it terminates but the results are not that go. I want something that will just iterate the number of times, I tell it to and gives me the results
I am trying to implement something like this
Well, my problem scenario is I have a set of points and labels. So the job is to match the points with labels. I define a graph with all the possible (node,label) pairs. And define a affinity matrix of size (number_node_label pairs, number_node_label pairs)
And I want to maximize the function x'Ax with the constraints that sum of xs = 1. all xs >=0 i.e the point lies in a simplex.
For my affinity matrix
A(u,v) where u and v are one of the point,label pairs i.e, u=point1,label1 v=point2, label2 suppose
A(u,v) = exp(-abs(||point1-point2||-||label1-label2||)) / sigma A(u,v) = 0 if u==v
I want something like replicator equation