Abstract The time fractional diffusion equation with appropriate initial and boundary conditions in an n-dimensional whole-space and half-space is considered. Its solution has been obtained in terms of Green functions by Schneider and Wyss. For the problem in whole-space, an explicit representation of the Green functions can also be obtained. However, an explicit representation of the Green functions for the problem in half-space is difficult to determine, except in the special cases Þ = 1 with arbitrary n, or n = 1 with arbitrary Þ. In this paper, we solve these problems. By investigating the explicit relationship between the Green functions of the problem with initial conditions in whole-space and that of the same problem with initial and...
The main goal of this study is to find the solution of initial boundary value problem for the one-di...
AbstractThe fundamental solution of the fractional diffusion equation of distributed order in time (...
Fractional equations, which have derivatives of noninteger order, are very successful in describing ...
The fundamental solutions to time-fractional advection diffusion equation in a plane and a half-plan...
This paper presents a general solution for a space-and time-fractional diffusion-wave equation defin...
The one-dimensional time-fractional advection-diffusion equation with the Caputo time derivative is ...
In this paper, we consider a space-time fractional advection dispersion equation (STFADE) on a finit...
In this paper, we get exact solution of the time-fractional advection-dispersion equation with react...
Two approaches resulting in two different generalizations of the space-time-fractional advection-dif...
In recent time there is a very great interest in the study of differential equations of fractional o...
AbstractIn this paper, some uniqueness and existence results for the solutions of the initial-bounda...
The solutions of the space–time fractional diffusion equations and that of the space–time fractional...
AbstractThe solutions of the space–time fractional diffusion equations and that of the space–time fr...
We consider a time and space-symmetric fractional diffusion equation (TSS-FDE) under homogeneous Dir...
We revisit the Cauchy problem for the time-fractional diffusion equation, which is obtained from the...
The main goal of this study is to find the solution of initial boundary value problem for the one-di...
AbstractThe fundamental solution of the fractional diffusion equation of distributed order in time (...
Fractional equations, which have derivatives of noninteger order, are very successful in describing ...
The fundamental solutions to time-fractional advection diffusion equation in a plane and a half-plan...
This paper presents a general solution for a space-and time-fractional diffusion-wave equation defin...
The one-dimensional time-fractional advection-diffusion equation with the Caputo time derivative is ...
In this paper, we consider a space-time fractional advection dispersion equation (STFADE) on a finit...
In this paper, we get exact solution of the time-fractional advection-dispersion equation with react...
Two approaches resulting in two different generalizations of the space-time-fractional advection-dif...
In recent time there is a very great interest in the study of differential equations of fractional o...
AbstractIn this paper, some uniqueness and existence results for the solutions of the initial-bounda...
The solutions of the space–time fractional diffusion equations and that of the space–time fractional...
AbstractThe solutions of the space–time fractional diffusion equations and that of the space–time fr...
We consider a time and space-symmetric fractional diffusion equation (TSS-FDE) under homogeneous Dir...
We revisit the Cauchy problem for the time-fractional diffusion equation, which is obtained from the...
The main goal of this study is to find the solution of initial boundary value problem for the one-di...
AbstractThe fundamental solution of the fractional diffusion equation of distributed order in time (...
Fractional equations, which have derivatives of noninteger order, are very successful in describing ...