On Fractional Diffusion Equation with Caputo-Fabrizio Derivative and Memory Term

Binh Duy Ho; Van Kim Ho Thi; Long Le Dinh; Nguyen Hoang Luc; Phuong Nguyen

doi:10.1155/2021/9259967

Advances in Mathematical Physics (Jan 2021)

On Fractional Diffusion Equation with Caputo-Fabrizio Derivative and Memory Term

Binh Duy Ho,
Van Kim Ho Thi,
Long Le Dinh,
Nguyen Hoang Luc,
Phuong Nguyen

Affiliations

Binh Duy Ho: Division of Applied Mathematics, Thu Dau Mot University, Binh Duong Province, Vietnam
Van Kim Ho Thi: Division of Applied Mathematics, Thu Dau Mot University, Binh Duong Province, Vietnam
Long Le Dinh: Division of Applied Mathematics, Thu Dau Mot University, Binh Duong Province, Vietnam
Nguyen Hoang Luc: Division of Applied Mathematics, Thu Dau Mot University, Binh Duong Province, Vietnam
Phuong Nguyen: Faculty of Fundamental Science, Industrial University of Ho Chi Minh City, Vietnam

DOI: https://doi.org/10.1155/2021/9259967
Journal volume & issue: Vol. 2021

Abstract

Read online

In this paper, we examine a nonlinear fractional diffusion equation containing viscosity terms with derivative in the sense of Caputo-Fabrizio. First, we establish the local existence and uniqueness of lightweight solutions under some assumptions about the input data. Then, we get the global solution using some new techniques. Our main idea is to combine theories of Banach’s fixed point theorem, Hilbert scale theory of space, and some Sobolev embedding.

Published in Advances in Mathematical Physics

ISSN: 1687-9120 (Print); 1687-9139 (Online)
Publisher: Wiley
Country of publisher: United Kingdom
LCC subjects: Science: Physics
Website: https://onlinelibrary.wiley.com/journal/3197

About the journal