Canonical Expansion of PT-Symmetric Operators and Perturbation Theory
Abstract
Let H be any symmetric Schr\"odinger operator of the type -2+(x12+...+xd2)+igW(x1,...,xd) on L2(d), where W is any odd homogeneous polynomial and g∈. It is proved that H is self-adjoint and that its eigenvalues coincide (up to a sign) with the singular values of H, i.e. the eigenvalues of H H. Moreover we explicitly construct the canonical expansion of H and determine the singular values μj of H through the Borel summability of their divergent perturbation theory. The singular values yield estimates of the location of the eigenvalues j of H by Weyl's inequalities.
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