On Computing with Some Convex Relaxations for the Maximum-Entropy Sampling Problem
基于协方差矩阵分解,提出了一种对NP难约束最大熵采样问题的上界推广,证明了该分解上界在缩放和分解选择下的不变性,并给出了可用于分支定界法的变量固定方法,实验验证了其有效性。
Based on a factorization of an input covariance matrix, we define a mild generalization of an upper bound of Nikolov and of Li and Xie for the NP-hard constrained maximum-entropy sampling problem ( CMESP ). We demonstrate that this factorization bound is invariant under scaling and independent of the particular factorization chosen. We give a variable-fixing methodology that could be used in a branch-and-bound scheme based on the factorization bound for exact solution of CMESP , and we demonstrate that its ability to fix is independent of the factorization chosen. We report on successful experiments with a commercial nonlinear programming solver. We further demonstrate that the known “mixing” technique can be successfully used to combine the factorization bound with the factorization bound of the complementary CMESP and with the “linx bound” of Anstreicher. History: Andrea Lodi, area editor for Design & Analysis of Algorithms–Discrete. Funding: This work was supported by the Conselho Nacional de Desenvolvimento Científico e Tecnológico [Grants 305444/2019-0 and 434683/2018-3] and the Air Force Office of Scientific Research [Grant A9550-19-1-0175].