Existence of solutions to a nonlinear fractional diffusion equation with exponential growth

Jia Wei He; Yong Zhou; Ahmed Alsaedi; Bashir Ahmad

doi:10.15388/2024.29.34228

Articles

Jia Wei He

Guangxi University

https://orcid.org/0000-0001-5283-585X

Yong Zhou

Xiangtan University

Ahmed Alsaedi

King Abdulaziz University

Bashir Ahmad

King Abdulaziz University

https://orcid.org/0000-0001-5350-2977

Published 2024-01-18

https://doi.org/10.15388/2024.29.34228

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Keywords

diffusion equation
Caputo’s fractional derivative
exponential growth
Orlicz spaces

How to Cite

He, J.W. (2024) “Existence of solutions to a nonlinear fractional diffusion equation with exponential growth”, Nonlinear Analysis: Modelling and Control, 29(2), pp. 286–304. doi:10.15388/2024.29.34228.

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Abstract

In this paper, we study a Cauchy problem for a space–time fractional diffusion equation with exponential nonlinearity. Based on the standard L_p-L_q estimates of strongly continuous semigroup generated by fractional Laplace operator, we investigate the existence of global solutions for initial data with small norm in Orlicz space exp L^p(R_d) and a time weighted L^r(R_d) space. In the framework of the Hölder interpolation inequality, we also discuss the existence of local solutions without the Orlicz space.

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