A filter method for inverse nonlinear sideways heat equation

Nguyen Anh Triet; Donal O’Regan; Dumitru Baleanu; Nguyen Hoang Luc; Nguyen Can

doi:10.1186/s13662-020-02601-4

A filter method for inverse nonlinear sideways heat equation

Nguyen Anh Triet, Donal O’Regan, Dumitru Baleanu, Nguyen Hoang Luc, Nguyen Can

Mathematics

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5 Citations (Scopus)

Abstract

In this paper, we study a sideways heat equation with a nonlinear source in a bounded domain, in which the Cauchy data at x= X are given and the solution in 0 ≤ x< X is sought. The problem is severely ill-posed in the sense of Hadamard. Based on the fundamental solution to the sideways heat equation, we propose to solve this problem by the filter method of degree α, which generates a well-posed integral equation. Moreover, we show that its solution converges to the exact solution uniformly and strongly in L^p(ω, X; L²(R)) , ω∈ [ 0 , X) under a priori assumptions on the exact solution. The proposed regularized method is illustrated by numerical results in the final section.

Original language	English
Article number	149
Journal	Advances in Difference Equations
Volume	2020
Issue number	1
DOIs	https://doi.org/10.1186/s13662-020-02601-4
Publication status	Published - 1 Dec 2020

Keywords

Backward problem
Cauchy problem
Error estimate
Ill-posed problem
Nonlinear heat equation
Regularization method

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10.1186/s13662-020-02601-4

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abstract = "In this paper, we study a sideways heat equation with a nonlinear source in a bounded domain, in which the Cauchy data at x= X are given and the solution in 0 ≤ x< X is sought. The problem is severely ill-posed in the sense of Hadamard. Based on the fundamental solution to the sideways heat equation, we propose to solve this problem by the filter method of degree α, which generates a well-posed integral equation. Moreover, we show that its solution converges to the exact solution uniformly and strongly in Lp(ω, X; L2(R)) , ω∈ [ 0 , X) under a priori assumptions on the exact solution. The proposed regularized method is illustrated by numerical results in the final section.",

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AU - Anh Triet, Nguyen

AU - O’Regan, Donal

AU - Baleanu, Dumitru

AU - Hoang Luc, Nguyen

AU - Can, Nguyen

PY - 2020/12/1

Y1 - 2020/12/1

N2 - In this paper, we study a sideways heat equation with a nonlinear source in a bounded domain, in which the Cauchy data at x= X are given and the solution in 0 ≤ x< X is sought. The problem is severely ill-posed in the sense of Hadamard. Based on the fundamental solution to the sideways heat equation, we propose to solve this problem by the filter method of degree α, which generates a well-posed integral equation. Moreover, we show that its solution converges to the exact solution uniformly and strongly in Lp(ω, X; L2(R)) , ω∈ [ 0 , X) under a priori assumptions on the exact solution. The proposed regularized method is illustrated by numerical results in the final section.

AB - In this paper, we study a sideways heat equation with a nonlinear source in a bounded domain, in which the Cauchy data at x= X are given and the solution in 0 ≤ x< X is sought. The problem is severely ill-posed in the sense of Hadamard. Based on the fundamental solution to the sideways heat equation, we propose to solve this problem by the filter method of degree α, which generates a well-posed integral equation. Moreover, we show that its solution converges to the exact solution uniformly and strongly in Lp(ω, X; L2(R)) , ω∈ [ 0 , X) under a priori assumptions on the exact solution. The proposed regularized method is illustrated by numerical results in the final section.

KW - Backward problem

KW - Cauchy problem

KW - Error estimate

KW - Ill-posed problem

KW - Nonlinear heat equation

KW - Regularization method

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VL - 2020

JO - Advances in Difference Equations

JF - Advances in Difference Equations

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A filter method for inverse nonlinear sideways heat equation

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