On Fast-Diffusion Equations with Infinite Equilibrium Entropy and Finite Equilibrium Mass

Claudia Lederman; Peter A. Markowich

doi:10.1081/PDE-120019384

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On Fast-Diffusion Equations with Infinite Equilibrium Entropy and Finite Equilibrium Mass

Journal article

Peer reviewed

On Fast-Diffusion Equations with Infinite Equilibrium Entropy and Finite Equilibrium Mass

Claudia Lederman and Peter A. Markowich

Communications in partial differential equations, Vol.28(1-2), pp.301-332

06/01/2003

DOI: https://doi.org/10.1081/PDE-120019384

Abstract

We extend the existing theory on large-time asymptotics for convection-diffusion equations, based on the entropy-entropy dissipation approach, to certain fast diffusion equations with uniformly convex confinement potential and finite-mass but infinite-entropy equilibrium solutions. We prove existence of a mass preserving solution of the Cauchy problem and we show exponential convergence, as , at a precise rate to the corresponding equilibrium solution in the L 1 norm. As by-product we also derive corresponding generalized Sobolev inequalities.

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Title: On Fast-Diffusion Equations with Infinite Equilibrium Entropy and Finite Equilibrium Mass
Creators - without role: Claudia Lederman - Fundación Ciencias Exactas y Naturales
Peter A. Markowich - University of Vienna
Publication Details: Communications in partial differential equations, Vol.28(1-2), pp.301-332
Publisher: Taylor & Francis Group
Identifiers: 9945804408331
Academic Unit: King Abdullah University of Science & Technology
Language: English
Resource Type: Journal article