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Triple Variational Principles for Self-Adjoint Operator Functions

arXiv:1309.0797 · doi:10.1016/j.jfa.2015.09.004

Abstract

For a very general class of unbounded self-adjoint operator function we prove upper bounds for eigenvalues which lie within arbitrary gaps of the essential spectrum. These upper bounds are given by triple variations. Furthermore, we find conditions which imply that a point is in the resolvent set. For norm resolvent continuous operator functions we show that the variational inequality becomes an equality.

Examples have been added. The paper is to appear in the Journal of Functional Analysis