Geometric ergodicity for some space-time max-stable Markov chains

Max-stable processes are central models for spatial extremes. In this paper, we focus on some space-time max-stable models introduced in Embrechts et al. (2016). The processes considered induce discrete-time Markov chains taking values in the space of continuous functions from the unit sphere of R-3 to (0, infinity). We show that these Markov chains are geometrically ergodic. An interesting feature lies in the fact that the state space is not locally compact, making the classical methodology inapplicable. Instead, we use the fact that the state space is Polish and apply results presented in Hairer (2010). (C) 2018 Elsevier B.V. All rights reserved.

Geometric ergodicity for some space-time max-stable Markov chains

Dynamic Voxels Based on Ego-Conditioned Prediction: An Integrated Spatio-Temporal Framework for Motion Planning

Heterotopias and the History of Spaces

Universal Approximation Property of Hamiltonian Deep Neural Networks

Dynamic Voxels Based on Ego-Conditioned Prediction: An Integrated Spatio-Temporal Framework for Motion Planning

Heterotopias and the History of Spaces

Universal Approximation Property of Hamiltonian Deep Neural Networks