I am trying to infer an unknown vector
x in a high-dimensional space (thousands of dimensions), and have good measurements of its projections onto a few (15) directions -- i.e. if the columns of
v[i,j] form a basis for the space, I know
v[,j]*x = v[1,j]*x+...+v[n,j]*x[n] for
1<=j<=15, with a good idea of the error.
I also know that
x[i]>=0 for all
i. I would like some way to find nonnegative estimates of
x with projections close to the observed values.
I have tried using least-squares minimization with linear constraints, (optimizing a quadratic objective with linear constraints, using the
quadprog package in R). However, the result is not as close to the observed projetions as they should be, based on my knowledge of the observation error. I would like to assess if this is because there does not exist a better solution, or if the algorithm failed to find it for numerical reasons.
What is a good method for doing this sort of thing? Or, are there tricks for doing convex optimization in high-dimensional space?