The well-posedness for semilinear time fractional wave equations on R-N

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

doi:10.3934/era.2022151

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$The well-posedness for semilinear time fractional wave equations on R-N$

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The well-posedness for semilinear time fractional wave equations on R-N

Yong Zhou, Jia Wei He, Ahmed Alsaedi and Bashir Ahmad

Electronic research archive, Vol.30(8), pp.2981-3003

01/01/2022

DOI: https://doi.org/10.3934/era.2022151

Abstract

Mathematics

Physical Sciences

Science & Technology

This paper is concerned with the semilinear time fractional wave equations on the whole Euclidean space, also known as the super-diffusive equations. Considering the initial data in the fractional Sobolev spaces, we prove the local/global well-posedness results of L2-solutions for linear and semilinear problems. The methods of this paper rely upon the relevant wave operators estimates, Sobolev embedding and fixed point arguments.

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Title: The well-posedness for semilinear time fractional wave equations on R-N
Creators - without role: Yong Zhou - Xiangtan University
Jia Wei He - Guangxi University
Ahmed Alsaedi - King Abdulaziz University
Bashir Ahmad - King Abdulaziz University
Publication Details: Electronic research archive, Vol.30(8), pp.2981-3003
Publisher: Amer Inst Mathematical Sciences-Aims
Number of pages: 23
Grant note: 12071396; 12101142 / National Natural Science Foundation of China; National Natural Science Foundation of China (NSFC)
Identifiers: 9940177908331
Academic Unit: King Abdulaziz University
Language: English
Resource Type: Journal article