The Cauchy problem of coupled elliptic sine–Gordon equations with noise: Analysis of a general kernel-based regularization and reliable tools of computing

Developments in numerical methods for problems governed by nonlinear partial differential equations underpin simulations with sound arguments in diverse areas of science and engineering. In this paper, we explore the regularization method for the coupled elliptic sine–Gordon equations along with Cau...

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Bibliographic Details
Published in:Computers & mathematics with applications (1987) 2017-01, Vol.73 (1), p.141-162
Main Authors: Khoa, Vo Anh, Truong, Mai Thanh Nhat, Duy, Nguyen Ho Minh, Tuan, Nguyen Huy
Format: Article
Language:English
Subjects:
Cauchy problem
Cauchy problems
Computer programs
Computer simulation
Convergence rate
Elliptic sine–Gordon equations
Exact solutions
Highly oscillatory integrals
Ill-posedness
Integral equations
Iterative methods
Josephson junctions
Mathematical analysis
Mathematical models
Nonlinear differential equations
Nonlinear equations
Numerical analysis
Numerical methods
Partial differential equations
Regularization
Regularization methods
Reliability
Software
Stability
Studies
Superconductivity
Well posed problems
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Summary:Developments in numerical methods for problems governed by nonlinear partial differential equations underpin simulations with sound arguments in diverse areas of science and engineering. In this paper, we explore the regularization method for the coupled elliptic sine–Gordon equations along with Cauchy data. The system of equations originates from the static case of the coupled hyperbolic sine–Gordon equations modeling the coupled Josephson junctions in superconductivity, and so far it addresses the Josephson π-junctions. In general, the Cauchy problem is not well-posed, and herein the Hadamard-instability occurs drastically. Generalizing the kernel-based regularization method, we propose a stable approximate solution. Confirmed by the error estimate, this solution strongly converges to the exact solution in L2-norm. The main concern of this paper is also with the way to compute the regularized solution formed by an alike integral equation. We employ the proposed techniques that successfully approximated the highly oscillatory integral, and apply the Picard-like iteration to organize an efficient and reliable tool of computations. The results are viewed as the improvement as well as the generalization of many previous works. The paper is also accompanied by a numerical example that demonstrates the potential of this idea.
ISSN:0898-1221
1873-7668
DOI:10.1016/j.camwa.2016.11.001