The Double Transpose of the Ruelle Operator

Abstract

In this paper we study the double transpose of the L1(X,B(X),)-extensions of the Ruelle transfer operator Lf associated to a general real continuous potential f∈ C(X), where X=EN, the alphabet E is any compact metric space and is a maximal eigenmeasure. For this operator, denoted by L**f, we prove the existence of some non-negative eigenfunction, in the Banach lattice sense, associated to (Lf), the spectral radius of the Ruelle operator acting on C(X). As an application, we obtain a sufficient condition ensuring that the natural extension of the Ruelle operator to L1(X,B(X),) has an eigenfunction associated to (Lf). These eigenfunctions agree with the usual maximal eigenfunctions, when the potential f belongs to the H\"older, Walters or Bowen class. We also construct solutions to the classical and generalized variational problem, using the eigenvector constructed here.