使用上界模型的增量束方法

Incremental Bundle Methods using Upper Models

SIAM Journal on Optimization · 2018
被引 28
ABS 3

中文导读

提出了一类近端束方法,用于最小化具有和结构的凸非光滑函数,该方法利用函数的上界模型,允许跳过部分子函数的Oracle调用,并提供解质量的可靠后验估计。

Abstract

We propose a family of proximal bundle methods for minimizing sum-structured convex nondifferentiable functions which require two slightly uncommon assumptions that are satisfied in many relevant applications: Lipschitz continuity of the functions and oracles which also produce upper estimates on the function values. In exchange, the methods: (i) use upper models of the functions that allow one to estimate function values at points where the oracle has not been called; (ii) provide the oracles with more information about when the function computation can be interrupted, possibly diminishing their cost; (iii) allow one to skip oracle calls entirely for some of the component functions, not only at “null steps” but also at “serious steps''; (iv) provide explicit and reliable a posteriori estimates of the quality of the obtained solutions; (v) work with all possible combinations of different assumptions on how the oracles deal with not being able to compute the function with arbitrary accuracy. We also discuss the introduction of constraints (or, more generally, of easy components) and use of (partly) aggregated models.

优化算法非光滑优化凸优化束方法