Note on the Transition to Intermittency for the exponential of the Square of a Steinhaus Series

Abstract

Intermittency of EN(x,g)= g| SN(x)|2 as N +∞ is investigated on a d-dimensional torus , when SN(x) is a finite Steinhaus series of (2N+1)d terms normalized to <| SN(x)|2> =1. Assuming ergodicity of EN(x,g) as N +∞ in the domain g<1, where N +∞<EN(g)> exists, transition to intermittency is proved as g increases past the threshold gth=1. This transition goes together with a transition from (assumed) ergodicity at g<gth to a regime where N +∞||<EN(g)>-1∫EN(x,g) ddx=0 at g>gth. In this asymptotic sense one can say that ergodicity is lost as g increases past the value g=1.