AbstractWe introduce an increasing set of classes Γa (0⩽α⩽1) of infinitely divisible (i.d.) distributions on {0,1,2,…}, such that Γ0 is the set of all compound-geometric distributions and Γ1 the set of all compound-Poisson distributions, i.e. the set of all i.d. distributions on the non-negative integers. These classes are defined by recursion relations similar to those introduced by Katti [4] for Γ1 and by Steutel [7] for Γ0. These relations can be regarded as generalizations of those defining the so-called renewal sequences (cf. [5] and [2]). Several properties of i.d. distributions now appear as special cases of properties of the Γa'
Certain families of probability distribution functions maintain their infinite divisibility under re...
(Running head: Nested subclasses of infinitely divisible distributions) Abstract. It is shown that t...
In this paper we give a recursive scheme, involving Panjer's recursion, to compute the distribu...
We introduce an increasing set of classes Ga (0a1) of infinitely divisible (i.d.) distributions on {...
AbstractWe introduce an increasing set of classes Γa (0⩽α⩽1) of infinitely divisible (i.d.) distribu...
The starting point of this paper is the characterization of the compound-Poisson, i.e. the infinitel...
Two sequences related by the recurrence equations defining infinite divisible lattice distributions ...
This paper introduces and studies a family of new classes of infinitely divisible distributions on R...
We consider the infinite divisibility of distributions of some well-known inverse subordinators. Usi...
In these paper we introduce a new class of exponential sums from which various known as well as new ...
The aim of this paper is to give some new characterizations of discrete compound Poisson distributio...
Certain characterizations of recently proposed univariate continuous distributions are presented in ...
Abstract. Under the geometric compounding model, we f i s t investigate the relationship between the...
Closure results in class proved recently for geometric compounds are generalized to general compound...
AbstractLα (0 ≦ α ≦ 1) is a class of infinitely divisible distributions defined by restricting the m...
Certain families of probability distribution functions maintain their infinite divisibility under re...
(Running head: Nested subclasses of infinitely divisible distributions) Abstract. It is shown that t...
In this paper we give a recursive scheme, involving Panjer's recursion, to compute the distribu...
We introduce an increasing set of classes Ga (0a1) of infinitely divisible (i.d.) distributions on {...
AbstractWe introduce an increasing set of classes Γa (0⩽α⩽1) of infinitely divisible (i.d.) distribu...
The starting point of this paper is the characterization of the compound-Poisson, i.e. the infinitel...
Two sequences related by the recurrence equations defining infinite divisible lattice distributions ...
This paper introduces and studies a family of new classes of infinitely divisible distributions on R...
We consider the infinite divisibility of distributions of some well-known inverse subordinators. Usi...
In these paper we introduce a new class of exponential sums from which various known as well as new ...
The aim of this paper is to give some new characterizations of discrete compound Poisson distributio...
Certain characterizations of recently proposed univariate continuous distributions are presented in ...
Abstract. Under the geometric compounding model, we f i s t investigate the relationship between the...
Closure results in class proved recently for geometric compounds are generalized to general compound...
AbstractLα (0 ≦ α ≦ 1) is a class of infinitely divisible distributions defined by restricting the m...
Certain families of probability distribution functions maintain their infinite divisibility under re...
(Running head: Nested subclasses of infinitely divisible distributions) Abstract. It is shown that t...
In this paper we give a recursive scheme, involving Panjer's recursion, to compute the distribu...