Reprint of: Boundary conditions for fractional diffusion
Journal article, 2018
This paper derives physically meaningful boundary conditions for fractional diffusion equations, using a mass balance approach. Numerical solutions are presented, and theoretical properties are reviewed, including well-posedness and steady state solutions. Absorbing and reflecting boundary conditions are considered, and illustrated through several examples. Reflecting boundary conditions involve fractional derivatives. The Caputo fractional derivative is shown to be unsuitable for modeling fractional diffusion, since the resulting boundary value problem is not positivity preserving.
Fractional calculus
Boundary value problem
Numerical solution
Well-posed
Author
Boris Baeumer
University of Otago
Mihaly Kovacs
University of Gothenburg
Chalmers, Mathematical Sciences, Applied Mathematics and Statistics
Mark M. Meerschaert
Michigan State University
Harish Sankaranarayanan
Michigan State University
Journal of Computational and Applied Mathematics
0377-0427 (ISSN)
Vol. 339 414-430Subject Categories
Applied Mechanics
Computational Mathematics
Mathematical Analysis
DOI
10.1016/j.cam.2018.03.007