Title of article
Some uniqueness and existence results for the initial-boundary-value problems for the generalized time-fractional diffusion equation
Author/Authors
Yury Luchko، نويسنده ,
Issue Information
دوهفته نامه با شماره پیاپی سال 2010
Pages
7
From page
1766
To page
1772
Abstract
In this paper, some uniqueness and existence results for the solutions of the initial-
boundary-value problems for the generalized time-fractional diffusion equation over an
open bounded domain G .0; T /; G Rn are given. To establish the uniqueness of the
solution, a maximum principle for the generalized time-fractional diffusion equation is
used. In turn, the maximum principle is based on an extremum principle for the Caputo
Dzherbashyan fractional derivative that is considered in the paper, too. Another important
consequence of the maximum principle is the continuous dependence of the solution on
the problem data. To show the existence of the solution, the Fourier method of the variable
separation is used to construct a formal solution. Under certain conditions, the formal
solution is shown to be a generalized solution of the initial-boundary-value problem for
the generalized time-fractional diffusion equation that turns out to be a classical solution
under some additional conditions.
Keywords
Fourier method , Initial-boundary-value problems , Maximum principle , Caputo–Dzherbashyan fractional derivative , generalized solution , Generalized time-fractional diffusion equation
Journal title
Computers and Mathematics with Applications
Serial Year
2010
Journal title
Computers and Mathematics with Applications
Record number
921306
Link To Document