Formal consistency versus actual convergence rates of difference schemes for fractional-derivative boundary value problems
Gracia Lozano, José Luis (Universidad de Zaragoza) ; Stynes, Martin
Resumen: Finite difference methods for approximating fractional derivatives are often analyzed by determining their order of consistency when applied to smooth functions, but the relationship between this measure and their actual numerical performance is unclear. Thus in this paper several wellknown difference schemes are tested numerically on simple Riemann-Liouville and Caputo boundary value problems posed on the interval [0, 1] to determine their orders of convergence (in the discrete maximum norm) in two unexceptional cases: (i) when the solution of the boundary-value problem is a polynomial (ii) when the data of the boundary value problem is smooth. In many cases these tests reveal gaps between a method’s theoretical order of consistency and its actual order of convergence. In particular, numerical results show that the popular shifted Gr¨unwald-Letnikov scheme fails to converge for a Riemann-Liouville example with a polynomial solution p(x), and a rigorous proof is given that this scheme (and some other schemes) cannot yield a convergent solution when p(0)¿ 0.
Idioma: Inglés
DOI: 10.1515/fca-2015-0027
Año: 2015
Publicado en: Fractional Calculus and Applied Analysis 18 (2015), 419-436
ISSN: 1311-0454
Factor impacto JCR: 2.246 (2015)
Categ. JCR: MATHEMATICS rank: 10 / 312 = 0.032 (2015) - Q1 - T1
Categ. JCR: MATHEMATICS, INTERDISCIPLINARY APPLICATIONS rank: 15 / 101 = 0.149 (2015) - Q1 - T1
Categ. JCR: MATHEMATICS, APPLIED rank: 9 / 254 = 0.035 (2015) - Q1 - T1
Factor impacto SCIMAGO: 1.551 - Applied Mathematics (Q1) - Analysis (Q1)
Financiación: info:eu-repo/grantAgreement/ES/MEC/MTM2010-16917
Tipo y forma: Article (Published version)
Área (Departamento): Área Matemática Aplicada (Dpto. Matemática Aplicada)
You must give appropriate credit, provide a link to the license, and indicate if changes were made. You may do so in any reasonable manner, but not in any way that suggests the licensor endorses you or your use. You may not use the material for commercial purposes. If you remix, transform, or build upon the material, you may not distribute the modified material.
Exportado de SIDERAL (2021-01-21-10:53:45)
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Idioma: Inglés
DOI: 10.1515/fca-2015-0027
Año: 2015
Publicado en: Fractional Calculus and Applied Analysis 18 (2015), 419-436
ISSN: 1311-0454
Factor impacto JCR: 2.246 (2015)
Categ. JCR: MATHEMATICS rank: 10 / 312 = 0.032 (2015) - Q1 - T1
Categ. JCR: MATHEMATICS, INTERDISCIPLINARY APPLICATIONS rank: 15 / 101 = 0.149 (2015) - Q1 - T1
Categ. JCR: MATHEMATICS, APPLIED rank: 9 / 254 = 0.035 (2015) - Q1 - T1
Factor impacto SCIMAGO: 1.551 - Applied Mathematics (Q1) - Analysis (Q1)
Financiación: info:eu-repo/grantAgreement/ES/MEC/MTM2010-16917
Tipo y forma: Article (Published version)
Área (Departamento): Área Matemática Aplicada (Dpto. Matemática Aplicada)
You must give appropriate credit, provide a link to the license, and indicate if changes were made. You may do so in any reasonable manner, but not in any way that suggests the licensor endorses you or your use. You may not use the material for commercial purposes. If you remix, transform, or build upon the material, you may not distribute the modified material. Exportado de SIDERAL (2021-01-21-10:53:45)
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Record created 2017-07-31, last modified 2021-01-21