一种用于锥束子问题的预处理迭代内点法

A preconditioned iterative interior point approach to the conic bundle subproblem

Mathematical Programming · 2023
被引 1
ABS 4

中文导读

针对谱束方法中的锥二次子问题,提出两种利用低秩结构的预处理迭代方法,理论分析条件数,实验表明确定性预处理在大规模问题中更高效。

Abstract

Abstract The conic bundle implementation of the spectral bundle method for large scale semidefinite programming solves in each iteration a semidefinite quadratic subproblem by an interior point approach. For larger cutting model sizes the limiting operation is collecting and factorizing a Schur complement of the primal-dual KKT system. We explore possibilities to improve on this by an iterative approach that exploits structural low rank properties. Two preconditioning approaches are proposed and analyzed. Both might be of interest for rank structured positive definite systems in general. The first employs projections onto random subspaces, the second projects onto a subspace that is chosen deterministically based on structural interior point properties. For both approaches theoretic bounds are derived for the associated condition number. In the instances tested the deterministic preconditioner provides surprisingly efficient control on the actual condition number. The results suggest that for large scale instances the iterative solver is usually the better choice if precision requirements are moderate or if the size of the Schur complemented system clearly exceeds the active dimension within the subspace giving rise to the cutting model of the bundle method.

半定规划内点法预处理技术大规模优化