Well-posed results for nonlocal biparabolic equation with linear and nonlinear source terms

Le Dinh Long; Ho Duy Binh; Kim Van Ho Thi; Van Thinh Nguyen

doi:10.1186/s13662-021-03602-7

Advances in Difference Equations (Oct 2021)

Well-posed results for nonlocal biparabolic equation with linear and nonlinear source terms

Le Dinh Long,
Ho Duy Binh,
Kim Van Ho Thi,
Van Thinh Nguyen

Affiliations

Le Dinh Long: Division of Applied Mathematics, Thu Dau Mot University
Ho Duy Binh: Division of Applied Mathematics, Thu Dau Mot University
Kim Van Ho Thi: Division of Applied Mathematics, Thu Dau Mot University
Van Thinh Nguyen: Department of Civil and Environmental Engineering, Seoul National University

DOI: https://doi.org/10.1186/s13662-021-03602-7
Journal volume & issue: Vol. 2021, no. 1
pp. 1 – 16

Abstract

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Abstract In this paper, we consider the biparabolic problem under nonlocal conditions with both linear and nonlinear source terms. We derive the regularity property of the mild solution for the linear source term while we apply the Banach fixed-point theorem to study the existence and uniqueness of the mild solution for the nonlinear source term. In both cases, we show that the mild solution of our problem converges to the solution of an initial value problem as the parameter epsilon tends to zero. The novelty in our study can be considered as one of the first results on biparabolic equations with nonlocal conditions.

Published in Advances in Difference Equations

ISSN: 1687-1839 (Print); 1687-1847 (Online)
Publisher: SpringerOpen
Country of publisher: United Kingdom
LCC subjects: Science: Mathematics
Website: http://www.advancesindifferenceequations.com/

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