Add to ORKGIn this paper we present a numerical method to solve a one-dimensional, one-phase extended Stefan problem with fractional time derivative described in the Caputo sense. The proposed method is based on applying a similarity variable for the anomalous-diffusion equation and the finite difference method. In the final part, examples of numerical results are discussed
The aim of this paper is the adaptation of the alternating phase truncation (APT) method for solving...
We propose an efficient numerical method for a class of fractional diffusion-wave equations with the...
The classical one-phase one-dimensional Stefan problem is numerically solved on rectangles, Rj, of i...
A one-dimensional, single phase Stefan Problem is considered. This problem is shown to have a unique...
Similarity method is employed to solve multiterm time-fractional diffusion equation. The orders of t...
Two fractional two-phase Stefan-like problems are considered by using Riemann-Liouville and Caputo d...
A Finite Element Method formulation is developed for the solution of the anomalous diffusion equati...
We consider a semi-infinite one-dimensional phase-change material with two unknown constant thermal ...
This paper deals with some numerical issues about the rational approximation to fractional different...
This paper deals with some numerical issues about the rational approximation to fractional different...
The macroscopic description of matter undergoing a phase change (the Stefan Problem) can be formulat...
The macroscopic description of matter undergoing a phase change (the Stefan Problem) can be formulat...
The classical one-phase one-dimensional Stefan problem is numerically solved on rectangles, Rj, of i...
A Stefan problem is a problem involving a parabolic differential equation with a moving boundary. W...
The classical one-phase one-dimensional Stefan problem is numerically solved on rectangles, Rj, of i...
The aim of this paper is the adaptation of the alternating phase truncation (APT) method for solving...
We propose an efficient numerical method for a class of fractional diffusion-wave equations with the...
The classical one-phase one-dimensional Stefan problem is numerically solved on rectangles, Rj, of i...
A one-dimensional, single phase Stefan Problem is considered. This problem is shown to have a unique...
Similarity method is employed to solve multiterm time-fractional diffusion equation. The orders of t...
Two fractional two-phase Stefan-like problems are considered by using Riemann-Liouville and Caputo d...
A Finite Element Method formulation is developed for the solution of the anomalous diffusion equati...
We consider a semi-infinite one-dimensional phase-change material with two unknown constant thermal ...
This paper deals with some numerical issues about the rational approximation to fractional different...
This paper deals with some numerical issues about the rational approximation to fractional different...
The macroscopic description of matter undergoing a phase change (the Stefan Problem) can be formulat...
The macroscopic description of matter undergoing a phase change (the Stefan Problem) can be formulat...
The classical one-phase one-dimensional Stefan problem is numerically solved on rectangles, Rj, of i...
A Stefan problem is a problem involving a parabolic differential equation with a moving boundary. W...
The classical one-phase one-dimensional Stefan problem is numerically solved on rectangles, Rj, of i...
The aim of this paper is the adaptation of the alternating phase truncation (APT) method for solving...
We propose an efficient numerical method for a class of fractional diffusion-wave equations with the...
The classical one-phase one-dimensional Stefan problem is numerically solved on rectangles, Rj, of i...