Open AccessOn self-similar solutions of time and space fractional sub-diffusion equations
Author(s) -
Fatma Al-Musalhi,
Erkinjon Karimov
Publication year - 2021
Publication title -
an international journal of optimization and control: theories and applications/e-an international journal of optimization and control: theories and applications
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.287
H-Index - 6
eISSN - 2146-5703
pISSN - 2146-0957
DOI - 10.11121/ijocta.2021.1065
Subject(s) - mathematics , fractional calculus , bessel function , partial differential equation , boundary value problem , mathematical analysis , ordinary differential equation , differential equation , type (biology) , space (punctuation) , transformation (genetics) , computer science , ecology , biochemistry , chemistry , gene , biology , operating system
In this paper, we have considered two different sub-diffusion equations involving Hilfer, hyper-Bessel and Erdelyi-Kober fractional derivatives. Using a special transformation, we equivalently reduce the considered boundary value problems for fractional partial differential equation to the corresponding problem for ordinary differential equation. An essential role is played by certain properties of Erd\'elyi-Kober integral and differential operators. We have applied also successive iteration method to obtain self-similar solutions in an explicit form. The obtained self-similar solutions are represented by generalized Wright type function. We have to note that the usage of imposed conditions is important to present self-similar solutions via given data.