Relationship of Stirling numbers of the first kind and Stirling numbers of the second kind;

In this paper,by using generating functions,we obtain some identities involving tangent,arctangent,Bernoulli,harmonic and Stirling numbers of the first kind.

Relationship of Stirling numbers of the first kind and Stirling numbers of the second kind;

The purpose of this paper is to give analogous definitions of Apostol type, obtain certain explicit formulas involving the Stirling numbers of the second kind and Gaussian hypergeometric functions respectively,discuss their special cases and applications.

In this paper,properties of generalized Stirling numbers of the second kind are discussed,some new recurrence formulas for Stirling numbers of the second kind have been obtained.

Considering the complexity on calculating the binomial distribution moments on the origin of higher-order with definition,Stirling number of the second kind of combinatorics was applied to probability.

The problem of the partition of a finite set can be solved by Stirling number of the second kind.

Stirling number of the second kind n n-i can be expressed by combination number.

Summation problem of the series ∑∞DDk=2f(k)ζ-(k) concerning Riemann Zeta function is researched by means of combinatorial mathematics and Stirling number of second kind, and the summation formula is given.

The new combinatorial identities of Stirling number of second kind and Bell polynomial are obtained and an application is given.