Multiplicities in the length spectrum and growth rate of Salem numbers

Abstract

We prove that mean multiplicities in the length spectrum of a non-compact arithmetic hyperbolic orbifold of dimension n ≥slant 4 have exponential growth rate g(L) ≥slant c e([n/2] - 1)LL1 + δ5, 7(n) , extending the analogous result for even dimensions of Belolipetsky, Lal\'in, Murillo and Thompson. Our proof is based on the study of (square-rootable) Salem numbers. As a counterpart, we also prove an asymptotic formula for the distribution of square-rootable Salem numbers by adapting the argument of G\"otze and Gusakova. It shows that one can not obtain a better estimate on mean multiplicities using our approach.