Riemann Hypothesis: Architecture of a conjecture "along" the lines of P\'olya. From trivial zeros and Harmonic Oscillator to information about non-trivial zeros of the Riemann zeta-function

Abstract

We propose an architecture of a conjecture concerning the Riemann Hypothesis in the form of an "alternative" to the P\'olya strategy: we construct a Hamiltonian HPolya whose spectrum coincides exactly with that of the Harmonic Oscillator Hamiltonian Hosc if and only if the Riemann Hypothesis holds true. In other words, it can be said that we formulate the Riemann Hypothesis by means of a non-commutative structure on the real axis, viz., that of the Harmonic Oscillator, by an equation of the type HPolya(Hosc) = Hosc: the Harmonic Oscillator operator, if viewed as an argument of HPolya, reproduces itself.