Title of article
Rates of decay to equilibria for image-Laplacian type equations Original Research Article
Author/Authors
Martial Agueh، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2008
Pages
19
From page
1909
To page
1927
Abstract
The long-time asymptotics for pp-Laplacian type equations View the MathML sourceρt=Δpρm=div(|∇ρm|p−2∇ρm) in RnRn is studied for p>1p>1 and View the MathML sourcem≥n−p+1n(p−1). The non-negative solutions of the equations are shown to behave asymptotically, as t→∞t→∞, like Barenblatt type solutions, and the explicit rates of decay are established for the convergence of the relative energy, the convergence with respect to the Wasserstein distances and the convergence with respect to the L1L1-norm. The rates are proved to be optimal for p=2p=2. The method used is based on mass transportation inequalities.
Keywords
Displacement convexity , rate of convergence , energy inequality , Generalized Talagrand’s inequalities , Csisz?r–Kullback type inequalities , Asymptotic behavior , Generalized logarithmic Sobolev inequalities
Journal title
Nonlinear Analysis Theory, Methods & Applications
Serial Year
2008
Journal title
Nonlinear Analysis Theory, Methods & Applications
Record number
860153
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