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Krylov--Bogolyubov averaging

We present the modified approach to the classical Bogolyubov-Krylov averaging, developed recently for the purpose of PDEs. It allows to treat Lipschitz perturbations of linear systems with pure imaginary spectrum and may be generalized to treat PDEs with small nonlinearities.

7 nodes6 linksoverview previewKrylov--Bogolyubov averaging
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Krylov--Bogolyubov averaging7 visible / 7 total nodes / 9 links
Co-authorshipCo-authorshipCo-authorshipAuthorshipAuthorshipAuthorshipTopic signalTopic signalTopic signalWKrylov--Bogolyubov averagingpreprint / 2020AWenwen JianResearcherASergei KuksinResearcherAYuan WuResearcherTmath-ph7974 worksTmath.MP7972 worksTmath.DS4970 works
PaperSignal 106 links

Krylov--Bogolyubov averaging

preprint / 2020

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