On self-adjointness of Poisson summation
Abstract
We show that a combination of well-known operators, namely τH is self-adjoint and ad-hoc related to the ζ function. Here τ is an involution appearing in Weil's positivity criteria needed for hermitrization, H a regularization operator introduced by Connes Co2 and essentially Poisson summation. We elaborate on the Hilbert-P\'olya conjecture, discuss why the Hermite-Biehler theorem, uncertainty relations and cohomologies are interesting in our scenario.
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