An integral relationship for a fractional one-phase Stefan problem-Reference-Cited by-同舟云学术

An integral relationship for a fractional one-phase Stefan problem

Published:2018-08-01 Issue:4 Volume:21 Page:901-918
ISSN:1314-2224
Container-title:Fractional Calculus and Applied Analysis
language:en
Short-container-title:

Author:

Roscani Sabrina¹,Tarzia Domingo¹

Affiliation:

1. CONICET - Depto. Matemática , FCE, Univ. Austral Paraguay 1950, S2000FZF , Rosario , Argentina

Abstract

Abstract A one-dimensional fractional one-phase Stefan problem with a temperature boundary condition at the fixed face is considered by using the Riemann–Liouville derivative. This formulation is more convenient than the one given in Roscani and Santillan (Fract. Calc. Appl. Anal., 16, No 4 (2013), 802–815) and Tarzia and Ceretani (Fract. Calc. Appl. Anal., 20, No 2 (2017), 399–421), because it allows us to work with Green’s identities (which does not apply when Caputo derivatives are considered). As a main result, an integral relationship between the temperature and the free boundary is obtained which is equivalent to the fractional Stefan condition. Moreover, an exact solution of similarity type expressed in terms of Wright functions is also given.

Publisher

Walter de Gruyter GmbH

Subject

Applied Mathematics,Analysis

Link

https://www.degruyter.com/document/doi/10.1515/fca-2018-0049/pdf

Reference39 articles.

1. V. Alexiades, A. D. Solomon, Mathematical Modelling of Melting and Freezing Processes. Hemisphere, Washington (1993).

2. C. Atkinson, Moving bounary problems for time fractional and composition dependent diffusion. Fract. Calc. Appl. Anal.15, No 2 (2012), 207–221; 10.2478/s13540-012-0015-2https://www.degruyter.com/view/j/fca.2012.15.issue-2/issue-files/fca.2012.15.issue-2.xml.

3. D. Banks, C. Fradin, Anomalous diffusion of proteins due to molecular crowding. Biophys. J.89, No 5 (2005), 2960–2971.

4. M. Blasiak, M. Klimek, Numerical solution of the one phase 1{D} fractional {S}tefan problem using the front fixing method. Math. Methods Appl.38, No 15 (2015), 3214–3228.

5. J. R. Cannon, The One–Dimensional Heat Equation. Cambridge University Press, Cambridge (1984).

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