A Framework for Solving Chance-Constrained Linear Matrix Inequality Programs

We propose a novel partial sample average approximation (PSAA) framework to solve the two main types of chance-constrained linear matrix inequality (CCLMI) problems: CCLMI with random technology matrix, and CCLMI with random right-hand side. We propose a series of computationally tractable PSAA-based approximations for CCLMI problems, analyze their properties, and derive sufficient conditions ensuring convexity. We derive several semide nite programming PSAA-reformulations efficiently solved by off-the-shelf solvers and design a sequential convex approximation method for the PSAA formulations containing bilinear matrix inequalities. We carry out a comprehensive numerical study on three practical CCLMI problems: robust truss topology design, calibration, and robust control. The tests attest the superiority of the PSAA reformulation and algorithmic framework over the scenario and sample average approximation methods.

Article

Download

View A Framework for Solving Chance-Constrained Linear Matrix Inequality Programs