Paper Info
Title
Positivity-preserving and asymptotic preserving method for 2D Keller-Segal equations.
Abstract
We propose a semi-discrete scheme for 2D Keller-Segel equations based on a symmetrization reformation, which is equivalent to the convex splitting method and is free of any nonlinear solver. We show that, this new scheme is stable as long as the initial condition does not exceed certain threshold, and it asymptotically preserves the quasi-static limit in the transient regime. Furthermore, we show that the fully discrete scheme is conservative and positivity preserving, which makes it ideal for simulations. The analogical schemes for the radial symmetric cases and the subcritical degenerate cases are also presented and analyzed. With extensive numerical tests, we verify the claimed properties of the methods and demonstrate their superiority in various challenging applications.
Year
DOI
Venue
2018
10.1090/mcom/3250
MATHEMATICS OF COMPUTATION
Field
DocType
Volume
Mathematical optimization,Mathematical analysis,Mathematics
Journal
87
Issue
ISSN
Citations 
311
0025-5718
6
PageRank 
References 
Authors
0.44
8
3
Name
Order
Citations
PageRank
Jian-Guo Liu119363.14
Li Wang225056.88
Zhennan Zhou385.24