On the convergence to stationary points of deterministic and randomized feasible descent directions methods

Amir Beck, Nadav Hallak

Research output: Contribution to journalArticlepeer-review

17 Scopus citations

Abstract

This paper studies the class of nonsmooth nonconvex problems in which the difference between a continuously differentiable function and a convex nonsmooth function is minimized over linear constraints. Our goal is to attain a point satisfying the stationarity necessary optimality condition, defined as the lack of feasible descent directions. Although elementary in smooth optimization, this condition is nontrivial when the objective function is nonsmooth, and, correspondingly, there are very few methods that obtain stationary points in such settings. We prove that stationarity in our model can be characterized by a finite number of directions and develop two methods, one deterministic and one random, that use these directions to obtain stationary points. Numerical experiments illustrate the benefit of obtaining a stationary point and the advantage of using the random method to do so.

Original languageEnglish
Pages (from-to)56-79
Number of pages24
JournalSIAM Journal on Optimization
Volume30
Issue number1
DOIs
StatePublished - 2020

Funding

FundersFunder number
Israel Science Foundation1821/16

    Keywords

    • Feasible descent directions
    • Randomized methods
    • Stationary points

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