Pole structure of the Hamiltonian ζ-function for a singular potential
Abstract
We study the pole structure of the ζ-function associated to the Hamiltonian H of a quantum mechanical particle living in the half-line R+, subject to the singular potential g x-2+x2. We show that H admits nontrivial self-adjoint extensions (SAE) in a given range of values of the parameter g. The ζ-functions of these operators present poles which depend on g and, in general, do not coincide with half an integer (they can even be irrational). The corresponding residues depend on the SAE considered.
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