A New Approach to the r-Whitney Numbers by Using Combinatorial Differential Calculus

Abstract

In the present article we introduce two new combinatorial interpretations of the r-Whitney numbers of the second kind obtained from the combinatorics of the differential operators associated to the grammar G:=\ y→ yxm, x→ x\. By specializing m=1 we obtain also a new combinatorial interpretation of the r-Stirling numbers of the second kind. Again, by specializing to the case r=0 we introduce a new generalization of the Stirling number of the second kind and through them a binomial type family of polynomials that generalizes Touchard's. Moreover, we show several well-known identities involving the r-Dowling polynomials and the r-Whitney numbers using the combinatorial differential calculus. Finally we prove that the r-Dowling polynomials are a Sheffer family relative to the generalized Touchard binomial family, study their umbral inverses, and introduce [m]-Stirling numbers of the first kind. From the relation between umbral calculus and the Riordan matrices we give several new combinatorial identities involving the r-Whitney number of both kinds, Bernoulli and Euler polynomials.