线性正半定规划的内点-乘子近端方法

An Interior Point-Proximal Method of Multipliers for Linear Positive Semi-Definite Programming

Journal of Optimization Theory and Applications · 2021
被引 11
ABS 3

中文导读

将内点-乘子近端方法推广到线性正半定规划问题,允许牛顿系统的不精确求解,并证明算法在温和假设下的多项式复杂度。

Abstract

Abstract In this paper we generalize the Interior Point-Proximal Method of Multipliers (IP-PMM) presented in Pougkakiotis and Gondzio (Comput Optim Appl 78:307–351, 2021. 10.1007/s10589-020-00240-9 ) for the solution of linear positive Semi-Definite Programming (SDP) problems, allowing inexactness in the solution of the associated Newton systems. In particular, we combine an infeasible Interior Point Method (IPM) with the Proximal Method of Multipliers (PMM) and interpret the algorithm (IP-PMM) as a primal-dual regularized IPM, suitable for solving SDP problems. We apply some iterations of an IPM to each sub-problem of the PMM until a satisfactory solution is found. We then update the PMM parameters, form a new IPM neighbourhood, and repeat this process. Given this framework, we prove polynomial complexity of the algorithm, under mild assumptions, and without requiring exact computations for the Newton directions. We furthermore provide a necessary condition for lack of strong duality, which can be used as a basis for constructing detection mechanisms for identifying pathological cases within IP-PMM.

线性规划半定规划内点法优化算法