English

Rank-Constrained Schur-Convex Optimization with Multiple Trace/Log-Det Constraints

Information Theory 2015-05-20 v2 math.IT

Abstract

Rank-constrained optimization problems have received an increasing intensity of interest recently, because many optimization problems in communications and signal processing applications can be cast into a rank-constrained optimization problem. However, due to the non-convex nature of rank constraints, a systematic solution to general rank-constrained problems has remained open for a long time. In this paper, we focus on a rank-constrained optimization problem with a Schur-convex/concave objective function and multiple trace/logdeterminant constraints. We first derive a structural result on the optimal solution of the rank-constrained problem using majorization theory. Based on the solution structure, we transform the rank-constrained problem into an equivalent problem with a unitary constraint. After that, we derive an iterative projected steepest descent algorithm which converges to a local optimal solution. Furthermore, we shall show that under some special cases, we can derive a closed-form global optimal solution. The numerical results show the superior performance of our proposed technique over the baseline schemes.

Keywords

Cite

@article{arxiv.1009.4268,
  title  = {Rank-Constrained Schur-Convex Optimization with Multiple Trace/Log-Det Constraints},
  author = {Hao Yu and Vincent K. N. Lau},
  journal= {arXiv preprint arXiv:1009.4268},
  year   = {2015}
}

Comments

Some related patents are now applied. To protect our intellectual property, we postponed to make our manuscript public

R2 v1 2026-06-21T16:17:21.975Z