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On the spectrum structure for one difference eigenvalue problem with nonlocal boundary conditions

    Mifodijus Sapagovas Affiliation
    ; Kristina Pupalaigė Affiliation
    ; Regimantas Čiupaila Affiliation
    ; Tadas Meškauskas Affiliation

Abstract

The difference eigenvalue problem approximating the one-dimensional differential equation with the variable weight coefficients in an integral conditions is considered. The cases without negative eigenvalue in the spectrum of difference eigenvalue problem were analyzed. Analysis of the conditions of stability of difference schemes for parabolic equations was carried out according to the theoretical results and results of the numerical experiment.

Keyword : difference eigenvalue problem, nonlocal boundary conditions, stability of difference schemes

How to Cite
Sapagovas, M., Pupalaigė, K., Čiupaila, R., & Meškauskas, T. (2023). On the spectrum structure for one difference eigenvalue problem with nonlocal boundary conditions. Mathematical Modelling and Analysis, 28(3), 522–541. https://doi.org/10.3846/mma.2023.17503
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Sep 4, 2023
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