Classical Adjoints for Ergodic Stochastic Control
Abstract
In this paper we consider ergodic optimal control of a diffusion process \Xut\t ≥ 0, taking values in n, where both drift and volatility are controlled. We establish a novel strong duality between the existence of a unique solution to the infinite horizon adjoint BSDE and strong dissipativity of Xu. We then proceed to show that the latter implies irreducibility, the strong Feller property and exponential ergodicity. We conclude by discussing the connection with ergodic BSDEs.
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