Operator splitting with spatial-temporal discretization

Andr\'as B\'atkai; Petra Csom\'os; B\'alint Farkas; Gregor Nickel

arXiv:1103.0316·math.FA·March 3, 2011

Operator splitting with spatial-temporal discretization

Andr\'as B\'atkai, Petra Csom\'os, B\'alint Farkas, Gregor Nickel

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TL;DR

This paper analyzes the convergence of operator splitting methods when combined with spatial discretization and rational approximations, providing insights into their theoretical properties.

Contribution

It offers a detailed convergence analysis of operator splitting methods integrated with spatial discretization and rational approximations.

Findings

01

Convergence conditions established for combined methods

02

Theoretical bounds on approximation errors

03

Insights into stability of discretized operator splitting

Abstract

Continuing earlier investigations, we analyze the convergence of operator splitting procedures combined with spatial discretization and rational approximations.

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Taxonomy

TopicsMatrix Theory and Algorithms · Characterization and Applications of Magnetic Nanoparticles · Numerical methods in inverse problems