Reduction to a Fredholm integral equation and numerical solution of the inverse Cauchy problem for the Schrödinger-Pauli equation

Yusif Gasimov; Abdeljalil Nachaoui; Aynura Aliyeva

doi:10.2478/ijmce-2026-0015

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Reduction to a Fredholm integral equation and numerical solution of the inverse Cauchy problem for the Schrödinger-Pauli equation

International Journal of Mathematics and Computer in Engineering

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By: Yusif Gasimov, Abdeljalil Nachaoui and Aynura Aliyeva

Open Access

|Jun 2026

Abstract

This paper studies the inverse Cauchy problem for the two-dimensional Schrödinger-Pauli equation, which models a spin- $\frac{1}{2}$ {1 \over 2} quantum particle in a magnetic field. The problem involves reconstructing an inaccessible boundary condition from overdetermined data, a severely ill-posed inverse problem. We develop a numerical method combining Lavrentiev regularization with Haar wavelet discretization, yielding a regularized Fredholm equation solved via an efficient collocation scheme with explicit matrix entries. Numerical results demonstrate first-order convergence and robustness to noise up to 10%. Notably, multi-frequency solutions exhibit enhanced noise stability compared to single-mode cases. The method provides a stable, efficient framework for boundary reconstruction in quantum systems with partial data.

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Articles in this issue

DOI: https://doi.org/10.2478/ijmce-2026-0015 | Journal eISSN: 2956-7068

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Language: English

Submitted on: Jan 12, 2026

Accepted on: Feb 24, 2026

Published on: Jun 2, 2026

Published by: Harran University

In partnership with: Paradigm Publishing Services

Publication frequency: 2 issues per year

Keywords:

Inverse Cauchy problem,

Schrödinger-Pauli equation,

Fredholm integral equation,

Haar wavelet,

collocation scheme

Related subjects:

Computer sciences,

Computer sciences, other,

Engineering,

Introductions and overviews,

Physics,

© 2026 Yusif Gasimov, Abdeljalil Nachaoui, Aynura Aliyeva, published by Harran University
This work is licensed under the Creative Commons Attribution 4.0 License.

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