Mathematics | |
Solvability and Stability of the Inverse Problem for the Quadratic Differential Pencil | |
Natalia P. Bondarenko1  Andrey V. Gaidel2  | |
[1] Department of Applied Mathematics and Physics, Samara National Research University, Moskovskoye Shosse 34, 443086 Samara, Russia;Department of Mechanics and Mathematics, Saratov State University, Astrakhanskaya 83, 410012 Saratov, Russia; | |
关键词: inverse spectral problem; quadratic differential pencil; global solvability; local solvability; stability; method of spectral mappings; | |
DOI : 10.3390/math9202617 | |
来源: DOAJ |
【 摘 要 】
The inverse spectral problem for the second-order differential pencil with quadratic dependence on the spectral parameter is studied. We obtain sufficient conditions for the global solvability of the inverse problem, prove its local solvability and stability. The problem is considered in the general case of complex-valued pencil coefficients and arbitrary eigenvalue multiplicities. Studying local solvability and stability, we take the possible splitting of multiple eigenvalues under a small perturbation of the spectrum into account. Our approach is constructive. It is based on the reduction of the non-linear inverse problem to a linear equation in the Banach space of infinite sequences. The theoretical results are illustrated by numerical examples.
【 授权许可】
Unknown