A nonlocal p-Laplacian evolution equation with Neumann boundary conditions

In this paper we study the nonlocal p-Laplacian type diffusion equation,ut (t, x) = under(∫, Ω) J (x - y) | u (t, y) - u (t, x) |p - 2 (u (t, y) - u (t, x)) d y . If p > 1, this is the nonlocal analogous problem to the well-known local p-Laplacian evolution equation ut = div (| ∇ u |p - 2 ∇ u...

ver descrição completa

Detalhes bibliográficos
Autores: Andreu, F., Mazón, J.M., Rossi, J.D., Toledo, J.
Tipo de documento: artigo
Estado:Versão publicada
Data de publicação:2008
País:Argentina
Recursos:Universidad Nacional de Buenos Aires. Facultad de Ciencias Exactas y Naturales
Repositório:Biblioteca Digital (UBA-FCEN)
Idioma:inglês
OAI Identifier:paperaa:paper_00217824_v90_n2_p201_Andreu
Acesso em linha:http://hdl.handle.net/20.500.12110/paper_00217824_v90_n2_p201_Andreu
Access Level:Acceso aberto
Palavra-chave:Neumann boundary conditions
Nonlocal diffusion
p-Laplacian
Total variation flow
Descrição
Resumo:In this paper we study the nonlocal p-Laplacian type diffusion equation,ut (t, x) = under(∫, Ω) J (x - y) | u (t, y) - u (t, x) |p - 2 (u (t, y) - u (t, x)) d y . If p > 1, this is the nonlocal analogous problem to the well-known local p-Laplacian evolution equation ut = div (| ∇ u |p - 2 ∇ u) with homogeneous Neumann boundary conditions. We prove existence and uniqueness of a strong solution, and if the kernel J is rescaled in an appropriate way, we show that the solutions to the corresponding nonlocal problems converge strongly in L∞ (0, T ; Lp (Ω)) to the solution of the p-Laplacian with homogeneous Neumann boundary conditions. The extreme case p = 1, that is, the nonlocal analogous to the total variation flow, is also analyzed. Finally, we study the asymptotic behavior of the solutions as t goes to infinity, showing the convergence to the mean value of the initial condition. © 2008 Elsevier Masson SAS. All rights reserved.