2021 journal article
Anderson Acceleration for a Class of Nonsmooth Fixed-Point Problems
ANDERSON ACCELERATION FOR A CLASS OF NONSMOOTH FIXED-POINT PROBLEMS. SIAM JOURNAL ON SCIENTIFIC COMPUTING, 43(5), S1–S20.
author keywords: Key words; nonsmooth equatioins; Anderson acceleration; integral equations; nonlinear equations; fixed-point problems
TL;DR:
It is proved that convergence of Anderson acceleration for a class of nonsmooth fixed-point problems for which the nonlinearities can be split into a smooth contractive part and a nonsm smooth part which has a smoothcontractive part.
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Source: ORCID
Added: January 21, 2021
Related DatabasesWeb of Science You must be logged in with an active subscription to view this.Article DataHistorySubmitted: 6 April 2020Accepted: 23 November 2020Published online: 20 January 2021Keywordsnonsmooth equatioins, Anderson acceleration, integral equations, nonlinear equations, fixed-point problemsAMS Subject Headings65H10, 45G10Publication DataISSN (print): 1064-8275ISSN (online): 1095-7197Publisher: Society for Industrial and Applied MathematicsCODEN: sjoce3