Title :
A measure-theoretic proof of the Markov property for hybrid systems with Markovian inputs
Author :
Tejada, Arturo ; González, Oscar R. ; Gray, W. Steven
Author_Institution :
Dept. of Electr. & Comput. Eng., Old Dominion Univ., Norfolk, VA
Abstract :
The behavior of a general hybrid system in discrete time can be represented by a non-linear difference equation x(k + 1) = Fk(x(k), thetas(k)), where thetas(k) is assumed to be a finite state Markov chain. An important step in the stability analysis of these systems is to establish the Markov property of (x(k), thetas(k)). There are, however, no complete proofs of this property which are simple to understand. This paper aims to correct this problem by presenting a complete and explicit proof, which uses only basic measure-theoretical concepts
Keywords :
Markov processes; difference equations; discrete time systems; nonlinear equations; numerical stability; Markov property; discrete time system; finite state Markov chain; hybrid systems; measure-theoretic proof; nonlinear difference equation; stability analysis; Algebra; Difference equations; Kernel; Linear systems; Markov processes; Particle measurements; Random variables; Stability analysis;
Conference_Titel :
System Theory, 2006. SSST '06. Proceeding of the Thirty-Eighth Southeastern Symposium on
Conference_Location :
Cookeville, TN
Print_ISBN :
0-7803-9457-7
DOI :
10.1109/SSST.2006.1619071
