Hamiltonians for the zeros of a general family of zeta functions
Abstract
Towards the Hilbert-P\'olya conjecture, in this paper, we present a general construction of Hamiltonian Hf, which leads a general family of Hurwitz zeta functions (-1)zn-1L(f,zn,x+1) defined by Mellin transform becomes their eigenstates under a suitable boundary condition, and the eigenvalues En have the property that zn=12(1-iEn) are the zeros of a general family of zeta functions L(f,z) L(f,z,1).
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