对偶次梯度方法中的遍历原始收敛性,II:原始问题不一致的情形

Ergodic, primal convergence in dual subgradient schemes for convex programming, II: the case of inconsistent primal problems

Mathematical Programming · 2016
被引 6
ABS 4

中文导读

研究当原始问题不可行时,拉格朗日对偶方法中原始子问题解序列是否仍提供有用信息,证明其收敛到最小化不可行性的解,并给出遍历次梯度算法的收敛结果。

Abstract

Consider the utilization of a Lagrangian dual method which is convergent for consistent convex optimization problems. When it is used to solve an infeasible optimization problem, its inconsistency will then manifest itself through the divergence of the sequence of dual iterates. Will then the sequence of primal subproblem solutions still yield relevant information regarding the primal program? We answer this question in the affirmative for a convex program and an associated subgradient algorithm for its Lagrange dual. We show that the primal–dual pair of programs corresponding to an associated homogeneous dual function is in turn associated with a saddle-point problem, in which—in the inconsistent case—the primal part amounts to finding a solution in the primal space such that the Euclidean norm of the infeasibility in the relaxed constraints is minimized; the dual part amounts to identifying a feasible steepest ascent direction for the Lagrangian dual function. We present convergence results for a conditional $$\varepsilon $$ -subgradient optimization algorithm applied to the Lagrangian dual problem, and the construction of an ergodic sequence of primal subproblem solutions; this composite algorithm yields convergence of the primal–dual sequence to the set of saddle-points of the associated homogeneous Lagrangian function; for linear programs, convergence to the subset in which the primal objective is at minimum is also achieved.

凸优化拉格朗日对偶次梯度算法线性规划鞍点问题