The paper is concerned with the distribution of the level N of the first crossing of a counting process trajectory with a lower boundary. Compound and simple Poisson or binomial processes, gamma renewal processes, and finally birth processes are considered. In the simple Poisson case, expressing the exact distribution of N requires the use of a classical family of Abel-Gontcharoff polynomials. For other cases convenient extensions of these polynomials into pseudopolynomials with a similar structure are necessary. Such extensions being applicable to other fields of applied probability, the central part of the present paper has been devoted to the building of these pseudopolynomials in a rather general framework.SCOPUS: ar.jinfo:eu-repo/seman...
In this paper, we introduce and study fractional versions of the Bell–Touchard process, the Poisson-...
AbstractThe Poisson process has the well-known Poisson count property: the count of points in any su...
We consider the difference process N of two independent renewal (counting) processes. Second-order a...
The paper is concerned with the first meeting or crossing problem between two independent trajectori...
This paper gives exact boundary crossing probabilities for finite time intervals associated with Poi...
Abstract. We consider here point processes Nf (t), t> 0, with independent increments and integer-...
Among Mixed Poisson processes, counting processes having geometrically distributed increments can b...
A compound Poisson process whose randomized time is an independent Poisson process is called a compo...
We consider a fractional counting process with jumps of amplitude $1,2,\ldots,k$, with $k\in \math...
In this paper we consider, how to find the marginal distributions of crossing time and renewal numbe...
The Poisson process is a stochastic counting process that arises naturally in a large variety of dai...
This paper is concerned with the first crossing of an order statistic point process through general ...
AbstractLet qnand sn, n ϵ N, respectively, be a set of polynomials of binomial type and a Sheffer se...
The class of counting processes constitutes a significant part of applied probability. The classic c...
This paper is concerned with the study of death processes with time-homogeneous non-linear death rat...
In this paper, we introduce and study fractional versions of the Bell–Touchard process, the Poisson-...
AbstractThe Poisson process has the well-known Poisson count property: the count of points in any su...
We consider the difference process N of two independent renewal (counting) processes. Second-order a...
The paper is concerned with the first meeting or crossing problem between two independent trajectori...
This paper gives exact boundary crossing probabilities for finite time intervals associated with Poi...
Abstract. We consider here point processes Nf (t), t> 0, with independent increments and integer-...
Among Mixed Poisson processes, counting processes having geometrically distributed increments can b...
A compound Poisson process whose randomized time is an independent Poisson process is called a compo...
We consider a fractional counting process with jumps of amplitude $1,2,\ldots,k$, with $k\in \math...
In this paper we consider, how to find the marginal distributions of crossing time and renewal numbe...
The Poisson process is a stochastic counting process that arises naturally in a large variety of dai...
This paper is concerned with the first crossing of an order statistic point process through general ...
AbstractLet qnand sn, n ϵ N, respectively, be a set of polynomials of binomial type and a Sheffer se...
The class of counting processes constitutes a significant part of applied probability. The classic c...
This paper is concerned with the study of death processes with time-homogeneous non-linear death rat...
In this paper, we introduce and study fractional versions of the Bell–Touchard process, the Poisson-...
AbstractThe Poisson process has the well-known Poisson count property: the count of points in any su...
We consider the difference process N of two independent renewal (counting) processes. Second-order a...