Broadband nature of power spectra for intermittent Maps with summable and nonsummable decay of correlations

Abstract

We present results on the broadband nature of the power spectrum S(ω), ω∈(0,2π), for a large class of nonuniformly expanding maps with summable and nonsummable decay of correlations. In particular, we consider a class of intermittent maps f:[0,1][0,1] with f(x)≈ x1+γ for x≈ 0, where γ∈(0,1). Such maps have summable decay of correlations when γ∈(0,12), and S(ω) extends to a continuous function on [0,2π] by the classical Wiener-Khintchine Theorem. We show that S(ω) is typically bounded away from zero for H\"older observables. Moreover, in the nonsummable case γ∈[12,1), we show that S(ω) is defined almost everywhere with a continuous extension S(ω) defined on (0,2π), and S(ω) is typically nonvanishing.