A parameter ASIP for the quadratic family

Abstract

Consider the quadratic family Ta(x) = a x (1 - x), for x ∈ [0, 1] and mixing Collet--Eckmann (CE) parameters a ∈ (2,4). For bounded , set a := - ∫ \, dμa, with μa the unique acim of Ta, and put (σa ())2 := ∫ a2 \, dμa + 2 Σi>0 ∫ a ( a Tia) \, dμa. For any transversal mixing Misiurewicz parameter a*, we find a positive measure set * of mixing CE parameters, containing a* as a Lebesgue density point, such that for any H\"older with σa*() 0, there exists ε >0 such that, for normalised Lebesgue measure on * [a*-ε, a*+ε], the functions i(a)= a(Tai+1(1/2))/σa () satisfy an almost sure invariance principle (ASIP) for any error exponent γ >2/5. (In particular, the Birkhoff sums satisfy this ASIP.) Our argument goes along the lines of Schnellmann's proof for piecewise expanding maps. We need to introduce a variant of Benedicks-Carleson parameter exclusion and to exploit fractional response and uniform exponential decay of correlations from a previous work of Baladi, Benedicks, and Schnellmann.

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