A note about fractional Stefan problem
Mathematical Physics
2019-11-13 v2 math.MP
Abstract
We derive the fractional version of one-phase one-dimensional Stefan model. We assume that the diffusive flux is given by the time-fractional Riemann-Liouville derivative, i.e. we impose the memory effect in the examined model.
Cite
@article{arxiv.1908.05136,
title = {A note about fractional Stefan problem},
author = {Adam Kubica and Katarzyna Ryszewska},
journal= {arXiv preprint arXiv:1908.05136},
year = {2019}
}
Related papers
View all related →
Analysis of PDEs · Mathematics
A self-similar solution to time-fractional Stefan problem
Adam Kubica, Katarzyna Ryszewska
2020-10-27
Analysis of PDEs · Mathematics
A New Mathematical Formulation for a Phase Change Problem with a Memory Flux
Sabrina Roscani, Julieta Bollati, Domingo Tarzia
2018-10-18
Analysis of PDEs · Mathematics
A space-fractional Stefan problem
Katarzyna Ryszewska
2020-06-08
Analysis of PDEs · Mathematics
Explicit Solutions to Fractional Stefan-like problems for Caputo and Riemann-Liouville Derivatives
Sabrina Roscani, Nahuel Caruso, Domingo Tarzia
2020-07-15
Analysis of PDEs · Mathematics
A note on models for anomalous phase-change processes
Andrea N. Ceretani
2020-02-18
Numerical Analysis · Mathematics
A weighted finite difference method for the fractional diffusion equation based on the Riemann-Liouville derivative
Ercília Sousa, Can Li
2011-09-13
Analysis of PDEs · Mathematics
Two equivalent Stefan's problems for the Time Fractional Diffusion Equation
Sabrina Roscani, Eduardo A. Santillan Marcus
2013-09-17
Analysis of PDEs · Mathematics
On a Space Fractional Stefan problem of Dirichlet type with Caputo flux
S. D. Roscani, K. Ryszewska, L. D. Venturato
2023-08-08
Mathematical Physics · Physics
Computable solutions of fractional partial differential equations related to reaction-diffusion systems
R. K. Saxena, A. M. Mathai, H. J. Haubold
2011-10-03
Analysis of PDEs · Mathematics
A new equivalence of Stefan's problems for the Time-Fractional-Diffusion Equation
Sabrina Roscani, Eduardo Santillan Marcus
2014-03-26
Statistical Mechanics · Physics
Fractional Diffusion based on Riemann-Liouville Fractional Derivatives
R. Hilfer
2007-05-23
Numerical Analysis · Mathematics
Numerical method for the one phase 1D fractional Stefan problem supported by an artificial neural network
M. Blasik
2019-10-02
Mathematical Physics · Physics
Computational efficiency of fractional diffusion using adaptive time step memory
Brian P. Sprouse, Christopher L. MacDonald, Gabriel A. Silva
2010-04-30
Analysis of PDEs · Mathematics
Analytical solutions of moving boundary problems for the time-fractional diffusion equation
M. Rodrigo
2023-01-04
Numerical Analysis · Mathematics
Efficient computation of the Grunwald-Letnikov fractional diffusion derivative using adaptive time step memory
Christopher L. MacDonald, Nirupama Bhattacharya, Brian P. Sprouse, Gabriel A. Silva
2016-05-04
Analysis of PDEs · Mathematics
Computational solutions of distributed oder reaction-diffusion systems associated with Riemann-Liouville derivatives
R. K. Saxena, A. M. Mathai, H. J. Haubold
2012-11-02
Analysis of PDEs · Mathematics
A one-phase space -- fractional Stefan problem with no liquid initial domain
Sabrina Roscani, Katarzyna Ryszewska, Lucas Venturato
2021-11-15
Analysis of PDEs · Mathematics
On the two-phase fractional Stefan problem
Félix del Teso, Jørgen Endal, Juan Luis Vázquez
2020-02-05
Analysis of PDEs · Mathematics
Explicit solution for a two--phase fractional Stefan problem with a heat flux condition at the fixed face
Sabrina Roscani, Domingo Tarzia
2018-05-24
Mathematical Physics · Physics
Space-time fractional reaction-diffusion equations associated with a generalized Riemann-Liouville fractional derivative
R. K. Saxena, A. M. Mathai, H. J. Haubold
2014-09-11
Analysis of PDEs · Mathematics
Forward and Inverse Problems for Subdiffusion Equation with Time-Dependent Coefficients
Ravshan Ashurov, Yusuf Fayziev, Muattar Khudoykulova
2023-05-02
Analysis of PDEs · Mathematics
Time fractional gradient flows: Theory and numerics
Wenbo Li, Abner J. Salgado
2021-01-05
Analysis of PDEs · Mathematics
A unified way to solve IVPs and IBVPs for the time-fractional diffusion-wave equation
Marianito R. Rodrigo
2021-10-25
Probability · Mathematics
Fractional diffusion-type equations with exponential and logarithmic differential operators
Luisa Beghin
2016-01-08
Exactly Solvable and Integrable Systems · Physics
Symmetry analysis for time-fractional convection-diffusion equation
Junjun Zhang, Jun Zhang
2015-12-09