Add to ORKGIn this paper, we investigate some combinatorial sequences based on the generalized Stirling numbers and the λ-analogues of r-Stirling numbers of the first kind, then derive their moment representations in use of probabilistic methods. We also provide identities related to r-Stirling numbers of the first kind, Stirling numbers and Daehee numbers
The Stirling numbers of the second kind S(n, k) satisfy S(n, 0)<¿<S(n, kn)=S(n, kn+1)>¿>...
We review the history and various approaches to the derivation of Stirling’s series. We use a differ...
AbstractDetermining the location of the maximum of Stirling numbers is a well-developed area. In thi...
In this paper we introduce and investigate moment generating Stirling numbers of the first kind, "`M...
We show that the Stirling numbers of the first and second kind can be represented in terms of moment...
The Stirling number of the second kind, S(n, k), enumerates the ways that n distinct objects can be ...
AbstractLet S(n,k) denote the Stirling number of the second kind, and let Kn be such that S(n,Kn−1)<...
Associated with each complex-valued random variable satisfying appropriate integrability conditions,...
Associated with each complex-valued random variable satisfying appropriate integrability conditions,...
Associated with each complex-valued random variable satisfying appropriate integrability conditions,...
Stirling numbers of the second kind, S(n, r), denote the number of partitions of a finite set of siz...
AbstractIn this paper we give a combinatorial interpretation of two classes of generalized Stirling ...
The Stirling numbers of the second kind S(n, k) satisfy S(n, 0)<¿<S(n, kn)=S(n, kn+1)>¿>...
AbstractUsing probabilistic arguments, we derive a sequence of polynomials in one variable which gen...
The Stirling numbers of the second kind S(n, k) satisfy S(n, 0)<¿<S(n, kn)=S(n, kn+1)>¿>...
The Stirling numbers of the second kind S(n, k) satisfy S(n, 0)<¿<S(n, kn)=S(n, kn+1)>¿>...
We review the history and various approaches to the derivation of Stirling’s series. We use a differ...
AbstractDetermining the location of the maximum of Stirling numbers is a well-developed area. In thi...
In this paper we introduce and investigate moment generating Stirling numbers of the first kind, "`M...
We show that the Stirling numbers of the first and second kind can be represented in terms of moment...
The Stirling number of the second kind, S(n, k), enumerates the ways that n distinct objects can be ...
AbstractLet S(n,k) denote the Stirling number of the second kind, and let Kn be such that S(n,Kn−1)<...
Associated with each complex-valued random variable satisfying appropriate integrability conditions,...
Associated with each complex-valued random variable satisfying appropriate integrability conditions,...
Associated with each complex-valued random variable satisfying appropriate integrability conditions,...
Stirling numbers of the second kind, S(n, r), denote the number of partitions of a finite set of siz...
AbstractIn this paper we give a combinatorial interpretation of two classes of generalized Stirling ...
The Stirling numbers of the second kind S(n, k) satisfy S(n, 0)<¿<S(n, kn)=S(n, kn+1)>¿>...
AbstractUsing probabilistic arguments, we derive a sequence of polynomials in one variable which gen...
The Stirling numbers of the second kind S(n, k) satisfy S(n, 0)<¿<S(n, kn)=S(n, kn+1)>¿>...
The Stirling numbers of the second kind S(n, k) satisfy S(n, 0)<¿<S(n, kn)=S(n, kn+1)>¿>...
We review the history and various approaches to the derivation of Stirling’s series. We use a differ...
AbstractDetermining the location of the maximum of Stirling numbers is a well-developed area. In thi...