SymDPoly: symmetry-adapted moment relaxations for noncommutative polynomial optimization

Abstract

Semidefinite relaxations are widely used to compute upper bounds on the objective of optimization problems involving noncommutative polynomials. Such optimization problems are prevalent in quantum information. We present an algorithm able to discover automatically and exploit the symmetries present in the problem formulation. We also provide an open source software library written in Scala ( https://denisrosset.github.io/symdpoly ) that computes symmetry-adapted semidefinite relaxations with interfaces to a variety of open-source and commercial semidefinite solvers. We discuss the advantages of symmetrization, namely reductions in memory use, computation time, and increase in the solution precision.