Paper Info
Title
Nonlocal diffusion and peridynamic models with Neumann type constraints and their numerical approximations.
Abstract
This paper studies nonlocal diffusion models associated with a finite nonlocal horizon parameter δ that characterizes the range of nonlocal interactions. The focus is on the variational formulation associated with Neumann type constraints and its numerical approximations. We establish the well-posedness for some variational problems associated and study their local limit as δ → 0. A main contribution is to derive a second order convergence to the local limit. We then discuss the numerical approximations including standard finite element methods and quadrature based finite difference methods. We study their convergence in the nonlocal setting and in the local limit.
Year
DOI
Venue
2017
10.1016/j.amc.2017.01.061
Applied Mathematics and Computation
Keywords
Field
DocType
Nonlocal diffusion,Peridynamic model,Nonlocal operator,Neumann problems,Finite element,Finite difference
Convergence (routing),Mathematical optimization,Mathematical analysis,Finite difference,Horizon,Finite element method,Finite difference method,Quadrature (mathematics),Mathematics
Journal
Volume
ISSN
Citations 
305
0096-3003
2
PageRank 
References 
Authors
0.39
5
3
Name
Order
Citations
PageRank
Yunzhe Tao120.39
Xiaochuan Tian2143.01
Qiang Du31692188.27