Asymptotic Stability of Critical Pulled Fronts via Resolvent Expansions Near the Essential Spectrum

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DOI10.1137/20M1343476zbMath1462.35058arXiv2012.02722OpenAlexW3154079207MaRDI QIDQ4985459

Arnd Scheel, Montie Avery

Publication date: 23 April 2021

Published in: SIAM Journal on Mathematical Analysis (Search for Journal in Brave)

Full work available at URL: https://arxiv.org/abs/2012.02722

zbMATH Keywords

nonlinear stability resolvent expansions pulled fronts

Mathematics Subject Classification ID

Stability in context of PDEs (35B35) Stability problems for infinite-dimensional dissipative dynamical systems (37L15) Higher-order parabolic equations (35K25) Traveling wave solutions (35C07) Semilinear parabolic equations (35K58)

Related Items (8)

Stability of Traveling Oscillating Fronts in Complex Ginzburg Landau Equations ⋮ Modulating traveling fronts in a dispersive Swift-Hohenberg equation coupled to an additional conservation law ⋮ Speed-up of traveling waves by negative chemotaxis ⋮ Universal selection of pulled fronts ⋮ Quantitative steepness, semi-FKPP reactions, and pushmi-pullyu fronts ⋮ Front selection in reaction-diffusion systems via diffusive normal forms ⋮ Spectral stability of the critical front in the extended Fisher-KPP equation ⋮ Sharp decay rates for localized perturbations to the critical front in the Ginzburg-Landau equation

Cites Work

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