Add to ORKGThis splitting techniques for MARKOV chains developed by NUMMELIN (1978a) and ATHREYA and NEY (1978b) are used to derive an imbedded renewal process in WOLD's point process with MARKOV-correlated intervals. This leads to a simple proof of renewal theorems for such processes. In particular, a key renewal theorem is proved, from which analogues to both BLACKWELL's and BREIMAN's forms of the renewal theorem can be deduced
Vita.Markov renewal theory, a branch of probability theory, is based on the properties of regenerati...
AbstractA fixed sampling point O is chosen independently of a renewal process on the whole real lin...
This thesis consists of four papers. In paper 1, we prove central limit theorems for Markov chains u...
This splitting techniques for MARKOV chains developed by NUMMELIN (1978a) and ATHREYA and NEY (1978b...
This "splitting techniques" for Markov chains developed by Nummelin (1978a) and Athreya and Ney (197...
AbstractLam and Lehoczky (1991) have recently given a number of extensions of classical renewal theo...
Lam and Lehoczky (1991) have recently given a number of extensions of classical renewal theorems to ...
A new construction of regeneration times is exploited to prove ergodic and renewal theorems for semi...
AbstractLet (S, £) be a measurable space with countably generated σ-field £ and (Mn, Xn)n⩾0 a Markov...
AbstractLet (S, £) be a measurable space with countably generated σ-field £ and (Mn, Xn)n⩾0 a Markov...
In this thesis we discuss a variety of problems concerning point processes and Markov processes; th...
discrete-time Markov chains and renewal processes exhibit convergence to stationarity. In the case o...
Let us consider two independent renewal processes generated by appropriate sequences of life times. ...
This paper concerns a Markovian piecewise linear process, based on a continuous-time Markov chain wi...
Ergodicity, continuity, finite approximations and rare visits of general Markov chains are investiga...
Vita.Markov renewal theory, a branch of probability theory, is based on the properties of regenerati...
AbstractA fixed sampling point O is chosen independently of a renewal process on the whole real lin...
This thesis consists of four papers. In paper 1, we prove central limit theorems for Markov chains u...
This splitting techniques for MARKOV chains developed by NUMMELIN (1978a) and ATHREYA and NEY (1978b...
This "splitting techniques" for Markov chains developed by Nummelin (1978a) and Athreya and Ney (197...
AbstractLam and Lehoczky (1991) have recently given a number of extensions of classical renewal theo...
Lam and Lehoczky (1991) have recently given a number of extensions of classical renewal theorems to ...
A new construction of regeneration times is exploited to prove ergodic and renewal theorems for semi...
AbstractLet (S, £) be a measurable space with countably generated σ-field £ and (Mn, Xn)n⩾0 a Markov...
AbstractLet (S, £) be a measurable space with countably generated σ-field £ and (Mn, Xn)n⩾0 a Markov...
In this thesis we discuss a variety of problems concerning point processes and Markov processes; th...
discrete-time Markov chains and renewal processes exhibit convergence to stationarity. In the case o...
Let us consider two independent renewal processes generated by appropriate sequences of life times. ...
This paper concerns a Markovian piecewise linear process, based on a continuous-time Markov chain wi...
Ergodicity, continuity, finite approximations and rare visits of general Markov chains are investiga...
Vita.Markov renewal theory, a branch of probability theory, is based on the properties of regenerati...
AbstractA fixed sampling point O is chosen independently of a renewal process on the whole real lin...
This thesis consists of four papers. In paper 1, we prove central limit theorems for Markov chains u...