We study asymptotic relations connecting unipotent averages of Sp(2g,ℤ) automorphic forms to their integrals over the moduli space of principally polarized abelian varieties. We obtain reformulations of the Riemann hypothesis as a class of problems concerning the computation of the equidistribution convergence rate in those asymptotic relations. We discuss applications of our results to closed string amplitudes. Remarkably, the Riemann hypothesis can be rephrased in terms of ultraviolet relations occurring in perturbative closed string theory.

Equidistribution rates, closed string amplitudes, and the Riemann hypothesis

CACCIATORI, SERGIO LUIGI
;
2010-01-01

Abstract

We study asymptotic relations connecting unipotent averages of Sp(2g,ℤ) automorphic forms to their integrals over the moduli space of principally polarized abelian varieties. We obtain reformulations of the Riemann hypothesis as a class of problems concerning the computation of the equidistribution convergence rate in those asymptotic relations. We discuss applications of our results to closed string amplitudes. Remarkably, the Riemann hypothesis can be rephrased in terms of ultraviolet relations occurring in perturbative closed string theory.
2010
Differential and Algebraic Geometry, Superstrings and Heterotic Strings
Cacciatori, SERGIO LUIGI; Matteo, C.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11383/1778315
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