Volume 2, Issue 3-4, September 1995, Pages 356 - 366
On the Spectral Theory of Operator Pencils in a Hilbert Space
Authors
Roman I. Andrushkiw
Corresponding Author
Roman I. Andrushkiw
Available Online 1 September 1995.
- DOI
- 10.2991/jnmp.1995.2.3-4.15How to use a DOI?
- Abstract
Consider the operator pencil L = A - B - 2 C, where A, B, and C are linear, in general unbounded and nonsymmetric, operators densely defined in a Hilbert space H. Sufficient conditions for the existence of the eigenvalues of L are investigated in the case when A, B and C are K-positive and K-symmetric operators in H, and a method to bracket the eigenvalues of L is developed by using a variational characterization of the problem (i) Lu = 0. The method generates a sequence of lower and upper bounds converging to the eigenvalues of L and can be considered an extension of the Temple-Lehman method to quadratic eigenvalue problems (i).
- Copyright
- © 2006, the Authors. Published by Atlantis Press.
- Open Access
- This is an open access article distributed under the CC BY-NC license (http://creativecommons.org/licenses/by-nc/4.0/).
Cite this article
TY - JOUR AU - Roman I. Andrushkiw PY - 1995 DA - 1995/09/01 TI - On the Spectral Theory of Operator Pencils in a Hilbert Space JO - Journal of Nonlinear Mathematical Physics SP - 356 EP - 366 VL - 2 IS - 3-4 SN - 1776-0852 UR - https://doi.org/10.2991/jnmp.1995.2.3-4.15 DO - 10.2991/jnmp.1995.2.3-4.15 ID - Andrushkiw1995 ER -