Invariant Finitely Additive Measures for General Markov Chains and the Doeblin Condition

Abstract: In this paper, we consider general Markov chains with discrete time in an arbitrary measurable (phase) space. Markov chains are given by a classical transition function that generates a pair of conjugate linear Markov operators in a Banach space of measurable bounded functions and in a Banach space of bounded finitely additive measures. We study sequences of Cesaro means of powers of Markov operators on the set of finitely additive probability measures. It is proved that the set of all limit measures (points) … Show more

“…The statement enclosed in Equation ( 16) is derived as per an ergodic theorem [33] for semi-Markov processes. It is important to mention that t i+1 − t i > 0, t i+1 − t i ≥ S w /T cc ;…”

Reliably Controlling Massive Traffic between a Sensor Network End Internet of Things Device Environment and a Hub Using Transmission Control Protocol Mechanisms

“…The statement enclosed in Equation ( 16) is derived as per an ergodic theorem [33] for semi-Markov processes. It is important to mention that t i+1 − t i > 0, t i+1 − t i ≥ S w /T cc ;…”

Reliably Controlling Massive Traffic between a Sensor Network End Internet of Things Device Environment and a Hub Using Transmission Control Protocol Mechanisms