On a problem in eigenvalue perturbation theory

Abstract

We consider additive perturbations of the type Kt=K0+tW, t∈ [0,1], where K0 and W are self-adjoint operators in a separable Hilbert space H and W is bounded. In addition, we assume that the range of W is a generating (i.e., cyclic) subspace for K0. If λ0 is an eigenvalue of K0, then under the additional assumption that W is nonnegative, the Lebesgue measure of the set of all t∈ [0,1] for which λ0 is an eigenvalue of Kt is known to be zero. We recall this result with its proof and show by explicit counterexample that the nonnegativity assumption W≥ 0 cannot be removed.