Solving clustered low-rank semidefinite programs arising from polynomial optimization
Abstract
We study a primal-dual interior point method specialized to clustered low-rank semidefinite programs requiring high precision numerics, which arise from certain multivariate polynomial (matrix) programs through sums-of-squares characterizations and sampling. We consider the interplay of sampling and symmetry reduction as well as a greedy method to obtain numerically good bases and sample points. We apply this to the computation of three-point bounds for the kissing number problem, for which we show a significant speedup. This allows for the computation of improved kissing number bounds in dimensions through . The approach performs well for problems with bad numerical conditioning, which we show through new computations for the binary sphere packing problem.
Cite
@article{arxiv.2202.12077,
title = {Solving clustered low-rank semidefinite programs arising from polynomial optimization},
author = {Nando Leijenhorst and David de Laat},
journal= {arXiv preprint arXiv:2202.12077},
year = {2025}
}
Comments
28 pages, revision based on suggestions by referee