Invariant probabilities for discrete time Linear Dynamics via Thermodynamic Formalism

Abstract

We show the existence of invariant ergodic σ-additive probability measures with full support on X for a class of linear operators L: X X, where L is a weighted shift operator and X either is the Banach space c0(R) or lp(R) for 1≤ p<∞. In order to do so, we adapt ideas from Thermodynamic Formalism as follows. For a given bounded H\"older continuous potential A:X R, we define a transfer operator LA which acts on continuous functions on X and prove that this operator satisfies a Ruelle-Perron-Frobenius theorem. That is, we show the existence of an eigenfunction for LA which provides us with a normalized potential A and an action of the dual operator LA* on the 1-Wasserstein space of probabilities on X with a unique fixed point, to which we refer to as Gibbs probability. It is worth noting that the definition of LA requires an a priori probability on the kernel of L. These results are extended to a wide class of operators with a non-trivial kernel defined on separable Banach spaces.