The object of this paper is to show that generalized Stirling numbers can be effectively used to evaluate a class of combinatorial sums involving generalized factorials
AbstractWe consider a class of sequences defined by triangular recurrence equations. This class cont...
In 1997 Bhargava generalized the factorial sequence to factorials in any Dedekind domain. He asked ...
Here presented is a unified approach to generalized Stirling functions by using generalized factoria...
The object of this paper is to show that generalized Stirling numbers can be effectively used to eva...
AbstractIn Part I, Stirling numbers of both kinds were used to define a binomial (Laurent) series of...
AbstractIt is shown that various well-known generalizations of Stirling numbers of the first and sec...
AbstractIn this paper we provide an algebraic approach to the generalized Stirling numbers (GSN). By...
We present a new approach to evaluating combinatorial sums by using finite differences. Let and be...
AbstractIn this paper we give a combinatorial interpretation of two classes of generalized Stirling ...
We employ the generalized factorials to define a Stirling-type pair {s(n,k;α,β,r),S(n,k;α,β,r)} whic...
Here presented is a unified approach to Stirling numbers and their generalizations as well as genera...
Here presented is a unified expression of Stirling numbers and their generalizations by using genera...
Abstract. In this paper, we propose the another yet generalization of Stirling numbers of the rst ki...
AbstractWe generalize the Stirling numbers of the first kind s(a, k) to the case where a may be an a...
We consider a class of sequences defined by triangular recurrence equations. This class contains Sti...
AbstractWe consider a class of sequences defined by triangular recurrence equations. This class cont...
In 1997 Bhargava generalized the factorial sequence to factorials in any Dedekind domain. He asked ...
Here presented is a unified approach to generalized Stirling functions by using generalized factoria...
The object of this paper is to show that generalized Stirling numbers can be effectively used to eva...
AbstractIn Part I, Stirling numbers of both kinds were used to define a binomial (Laurent) series of...
AbstractIt is shown that various well-known generalizations of Stirling numbers of the first and sec...
AbstractIn this paper we provide an algebraic approach to the generalized Stirling numbers (GSN). By...
We present a new approach to evaluating combinatorial sums by using finite differences. Let and be...
AbstractIn this paper we give a combinatorial interpretation of two classes of generalized Stirling ...
We employ the generalized factorials to define a Stirling-type pair {s(n,k;α,β,r),S(n,k;α,β,r)} whic...
Here presented is a unified approach to Stirling numbers and their generalizations as well as genera...
Here presented is a unified expression of Stirling numbers and their generalizations by using genera...
Abstract. In this paper, we propose the another yet generalization of Stirling numbers of the rst ki...
AbstractWe generalize the Stirling numbers of the first kind s(a, k) to the case where a may be an a...
We consider a class of sequences defined by triangular recurrence equations. This class contains Sti...
AbstractWe consider a class of sequences defined by triangular recurrence equations. This class cont...
In 1997 Bhargava generalized the factorial sequence to factorials in any Dedekind domain. He asked ...
Here presented is a unified approach to generalized Stirling functions by using generalized factoria...
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