We briefly discuss the effects of a random environment, of repeated periodic nature, on the counting processes used in risk theory. A review of relevant results on such kind of periodic influence is given. An explicit formulation of counting processes in a periodic random environment is presented. Two renewal processes, known in reliability maintenance as minimal repair and replacement policy, are considered. Their properties are studied in the case where the generating random sequence has a distribution with periodic failure rate. Necessary and sufficient conditions for a non-stationary Poisson process to have periodic intensity are established. Representation of these processes as a finite sum of independent Poisson random variables and a...
We study a Cox risk model that accounts for both, seasonal variations and random fluctuations in the ...
Abstract. We study a class of models used with success in the modelling of climatological sequences....
We present some correlated fractional counting processes on a finite-time interval. This will be do...
Compound non-homogenous Poisson processes with periodic claim intensity rates are studied in this wo...
Periodic random environments and mechanisms of their effect on imbedded random variables are discuss...
Periodic non-homogeneous Poisson processes and Poisson models under Markovian environments are studi...
Non-homogenous Poisson processes with periodic claim intensity rate are proposed as the claim counti...
Recently an active research on the effects of a random environment of periodic nature on the propert...
The risk theory studies mainly the behaviour of compound point processes and processes derived, wher...
This paper addresses the generalization of counting processes through the age formalism of Lévy Walk...
The Poisson process is a stochastic counting process that arises naturally in a large variety of dai...
This paper deals with a generalization of the class of renewal processes with absolutely continuous ...
We present some correlated fractional counting processes on a finite time interval. This will be don...
Among Mixed Poisson processes, counting processes having geometrically distributed increments can b...
We replicate a renewal process at random times, which is equivalent to nesting two renewal processes...
We study a Cox risk model that accounts for both, seasonal variations and random fluctuations in the ...
Abstract. We study a class of models used with success in the modelling of climatological sequences....
We present some correlated fractional counting processes on a finite-time interval. This will be do...
Compound non-homogenous Poisson processes with periodic claim intensity rates are studied in this wo...
Periodic random environments and mechanisms of their effect on imbedded random variables are discuss...
Periodic non-homogeneous Poisson processes and Poisson models under Markovian environments are studi...
Non-homogenous Poisson processes with periodic claim intensity rate are proposed as the claim counti...
Recently an active research on the effects of a random environment of periodic nature on the propert...
The risk theory studies mainly the behaviour of compound point processes and processes derived, wher...
This paper addresses the generalization of counting processes through the age formalism of Lévy Walk...
The Poisson process is a stochastic counting process that arises naturally in a large variety of dai...
This paper deals with a generalization of the class of renewal processes with absolutely continuous ...
We present some correlated fractional counting processes on a finite time interval. This will be don...
Among Mixed Poisson processes, counting processes having geometrically distributed increments can b...
We replicate a renewal process at random times, which is equivalent to nesting two renewal processes...
We study a Cox risk model that accounts for both, seasonal variations and random fluctuations in the ...
Abstract. We study a class of models used with success in the modelling of climatological sequences....
We present some correlated fractional counting processes on a finite-time interval. This will be do...
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