Lower bounds on the eigenvalue ratio with Robin boundary conditions

Mohammed Ahrami; Zakaria El Allali; Jamal Ounejma

doi:10.56947/gjom.v19i2.2825

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Published: Apr 30, 2025

DOI: https://doi.org/10.56947/gjom.v19i2.2825

Keywords:

Eigenvalue ratio, Vibrating string equations, Concave weight, Robin boundary conditions

Mohammed Ahrami

Multidisciplinary Faculty of Nador, Mohammed I University, Morocco

Zakaria El Allali

Multidisciplinary Faculty of Nador, Mohammed I University, Morocco

Jamal Ounejma

Multidisciplinary Faculty of Nador, Mohammed I University, Morocco

Abstract

We study the problem of minimizing the ratio of the first eigenvalues of vibrating string equations subject to the Robin boundary conditions for the class of concave weights. We show that, unlike the Dirichlet, Neumann and mixed boundary conditions, the constant weight is not minimizing for the class of concave weights. In addition, we prove a relation between the eigenvalues and real roots of the first Airy functions and their derivatives.

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How to Cite

Ahrami, M., Zakaria El Allali, & Jamal Ounejma. (2025). Lower bounds on the eigenvalue ratio with Robin boundary conditions. Gulf Journal of Mathematics, 19(2), 489-499. https://doi.org/10.56947/gjom.v19i2.2825

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Vol. 19 No. 2 (2025)

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