The Ruelle operator for symmetric β-shifts

Abstract

Consider m ∈ N and β ∈ (1, m + 1]. Assume that a∈ R can be represented in base β using a development in series a = Σ∞n = 1x(n)β-n where the sequence x = (x(n))n ∈ N take values in the alphabet Am := \0, …, m\. The above expression is called the β-expansion of a and it is not necessarily unique. We are interested in sequences x = (x(n))n ∈ N ∈ AmN which are associated to all possible values a which have a unique expansion. We denote the set of such x (with some more technical restrictions) by Xm,β ⊂AmN. The space Xm, β is called the symmetric β-shift associated to the pair (m, β). It is invariant by the shift map but in general it is not a subshift of finite type. Given a H\"older continuous potential A:Xm, β , we consider the Ruelle operator LA and we show the existence of a positive eigenfunction A and an eigenmeasure A for some appropriated values of m and β. We also consider a variational principle of pressure. Moreover, we prove that the family of entropies h(μtA)t>1 converges, when t ∞, to the maximal value among the set of all possible values of entropy of all A-maximizing probabilities.