NewEvery arXiv paper, its researchers & institutions — mapped.
control theory

Weak Feller Property of Non-linear Filters

arXiv:1812.05509

summary

The paper proves that the belief (non‑linear filter) process in partially observed controlled Markov systems satisfies the weak Feller property under certain continuity conditions on the transition and observation kernels.

Abstract

Weak Feller property of controlled and control-free Markov chains lead to many desirable properties. In control-free setups this leads to the existence of invariant probability measures for compact spaces and applicability of numerical approximation methods. For controlled setups, this leads to existence and approximation results for optimal control policies. We know from stochastic control theory that partially observed systems can be converted to fully observed systems by replacing the original state space with a probability measure-valued state space, with the corresponding kernel acting on probability measures known as the non-linear filter (belief) process. Establishing sufficient conditions for the weak Feller property for such processes is a significant problem, studied under various assumptions and setups in the literature. In this paper, we prove the weak Feller property of the non-linear filter process (i) first under weak continuity of the transition probability of controlled Markov chain and total variation continuity of its observation channel, and then, (ii) under total variation continuity of the transition probability of controlled Markov chain. The former result (i) has first appeared in Feinberg et. al. [Math. Oper. Res. 41(2) (2016) 656-681]. Here, we present a concise and easy to follow alternative proof for this existing result. The latter result (ii) establishes weak Feller property of non-linear filter process under conditions, which have not been previously reported in the literature.

Some of the results in this paper are to be presented at the 2019 IEEE Conference on Decision and Control

Topics & keywords

#weak feller property#nonlinear filter#partially observed systems#stochastic control#Markov processesweak Fellerbelief processtotal variation continuitycontrolled Markov chainobservation channel