Polynomial 3-mixing for smooth time-changes of horocycle flows

Abstract

Let (ht)t∈ R be the horocycle flow acting on (M,μ)=( SL(2,R),μ), where is a co-compact lattice in SL(2,R) and μ is the homogeneous probability measure locally given by the Haar measure on SL(2,R). Let τ∈ W6(M) be a strictly positive function and let μτ be the measure equivalent to μ with density τ. We consider the time changed flow (htτ)t∈ R and we show that there exists γ=γ(M,τ)>0 and a constant C>0 such that for any f0, f1, f2∈ W6(M) and for all 0=t0<t1<t2, we have \ |∫M Πi=02 fi hτti d μτ -Πi=02∫M fi d μτ |≤ C (Πi=02 \|fi\|6) (0≤ i<j≤ 2 |ti-tj|)-γ. With the same techniques, we establish polynomial mixing of all orders under the additional assumption of τ being fully supported on the discrete series.