An α-Robust Semidiscrete Finite Element Method for a Fokker–Planck Initial-Boundary Value Problem with Variable-Order Fractional Time Derivative

A time-fractional initial-boundary value problem of Fokker–Planck type is considered on the space-time domain Ω × [ 0 , T ] , where Ω is an open bounded domain in  R d for some d ≥ 1 , and the order α ( x ) of the Riemann-Liouville fractional derivative may vary in space with 1 / 2 < α ( x ) <...

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Bibliographic Details
Published in:Journal of scientific computing Vol. 86; no. 2; p. 22
Main Authors: Le, Kim-Ngan, Stynes, Martin
Format: Journal Article
Language:English
Published: New York Springer US 01.02.2021
Springer Nature B.V
Subjects:
Algorithms
Boundary value problems
Computational Mathematics and Numerical Analysis
Estimates
Finite element analysis
Finite element method
Mathematical analysis
Mathematical and Computational Engineering
Mathematical and Computational Physics
Mathematics
Mathematics and Statistics
Numerical analysis
Numerical methods
Random walk
Robustness (mathematics)
Theoretical
Fokker–Planck equation
Variable-order fractional derivative
robust
ISSN:0885-7474, 1573-7691
Online Access:Get full text
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Summary:A time-fractional initial-boundary value problem of Fokker–Planck type is considered on the space-time domain Ω × [ 0 , T ] , where Ω is an open bounded domain in  R d for some d ≥ 1 , and the order α ( x ) of the Riemann-Liouville fractional derivative may vary in space with 1 / 2 < α ( x ) < 1 for all  x . Such problems appear naturally in the formulation of certain continuous-time random walk models. Uniqueness of any solution u of the problem is proved under reasonable hypotheses. A semidiscrete numerical method, using finite elements in space to yield a solution u h ( t ) , is constructed. Error estimates for ‖ ( u - u h ) ( t ) ‖ L 2 ( Ω ) and ∫ 0 t ∂ t 1 - α ( u - u h ) ( s ) 1 2 d s are proved for each t ∈ [ 0 , T ] under the assumptions that the following quantities are finite: ‖ u ( · , 0 ) ‖ H 2 ( Ω ) , | u ( · , t ) | H 1 ( Ω ) for each  t , and ∫ 0 t [ ‖ u ( · , t ) ‖ H 2 ( Ω ) 2 + | ∂ t 1 - α u | H 2 ( Ω ) 2 ] , where u ( x ,  t ) is the unknown solution. Furthermore, these error estimates are α -robust: they do not fail when α → 1 , the classical Fokker–Planck problem. Sharper results are obtained for the special case where the drift term of the problem is not present (which is of interest in certain applications).
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ISSN:0885-7474
1573-7691
DOI:10.1007/s10915-020-01375-x