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Exponential ergodicity for stochastic equations of nonnegative processes with jumps

Martin Friesen, Peng Jin, Jonas Kremer, Barbara Rüdiger

2023Latin American Journal of Probability and Mathematical Statistics20 citationsDOIOpen Access PDF

Abstract

We study the long-time behavior for continuous-time Markov processes on the state space R 0 := [0, ), which arise as unique strong solutions to stochastic equations with jumps.We establish, under a global dissipativity condition combined with a comparison principle, exponential ergodicity in various Wasserstein distances on R 0 .Our main emphasis lies on the derivation of these estimates under minimal moment conditions to be imposed on the associated Lvy measures of the noises.We apply our method to continuous-state branching processes with immigration (shorted as CBI processes), to nonlinear CBI processes, and finally to CBI processes in Lvy random environments.

Topics & Concepts

ErgodicityMathematicsExponential functionApplied mathematicsStatistical physicsMathematical economicsEconometricsMathematical analysisStatisticsPhysicsStochastic processes and statistical mechanicsStochastic processes and financial applicationsMarkov Chains and Monte Carlo Methods
Exponential ergodicity for stochastic equations of nonnegative processes with jumps | Litcius