Diffusion Processes: entropy, Gibbs states and the continuous time Ruelle operator
Abstract
We consider a Riemmaniann compact manifold , the associated Laplacian and the corresponding Brownian motion , Given a Lipschitz function we consider the operator , which acts on differentiable functions via the operator for all . Denote by , the semigroup acting on functions given by We will show that this semigroup is a continuous-time version of the discrete-time Ruelle operator. Consider the positive differentiable eigenfunction associated to the main eigenvalue for the semigroup , . From the function , in a procedure similar to the one used in the case of discrete-time Thermodynamic Formalism, we can associate via a coboundary procedure a certain stationary Markov semigroup. The probability on the Skhorohod space obtained from this new stationary Markov semigroup can be seen as a stationary Gibbs state associated with the potential . We define entropy, pressure, the continuous-time Ruelle operator and we present a variational principle of pressure for such a setting.
Cite
@article{arxiv.2208.01993,
title = {Diffusion Processes: entropy, Gibbs states and the continuous time Ruelle operator},
author = {A. O. Lopes and G. Muller and A. Neumann},
journal= {arXiv preprint arXiv:2208.01993},
year = {2024}
}
Comments
In section 3 we present a more precise version of what is necessary to use in the previous part of the text