Sharp iteration asymptotics for transfer operators induced by greedy β-expansions

Abstract

We consider base-β expansions of Parry's type, where a0 ≥ a1 ≥ 1 are integers and a0<β<a0+1 is the positive solution to β2 = a0β+ a1 (the golden ratio corresponds to a0=a1=1). The map x βx- βx induces a discrete dynamical system on the interval [0,1) and we study its associated transfer (Perron-Frobenius) operator P. Our main result can be roughly summarized as follows: we explicitly construct two piecewise affine functions u and v with Pu=u and Pv=β-1 v such that for every sufficiently smooth F which is supported in [0,1] and satisfies ∫01 F \; d x=1, we have PkF= u +β-k ( F(1)-F(0) )v +o(β-k) in L∞. This is also compared with the case of integer bases, where more refined asymptotic formulas are possible.