DOIAbstract
AbstractIn this paper we give a combinatorial interpretation of two classes of generalized Stirling numbers, called p-Stirling numbers, and find several identities related to them
AbstractIn this paper we give a combinatorial interpretation of two classes of generalized Stirling numbers, called p-Stirling numbers, and find several identities related to them
AbstractIn this paper we give a combinatorial interpretation of two classes of generalized Stirling ...
We prove that for any k = 1, . . . , 2n the 2-adic order of the Stirling number S(2n, k) of the seco...
AbstractWe first find inequalities between the Stirling numbers S(n, r) for fixed n, then introduce ...
AbstractThe Pascal-type matrices obtained from the Stirling numbers of the first kind s(n,k) and of ...
AbstractAn investigation is made of the polynomials fk(n) = S(n + k, n) and gk(n) = (−1)k s(n, n − k...
AbstractThe domains of the Stirling numbers of both kinds are extended from N2 to Z2. These extensio...
AbstractLet [n] be the set {1,2, … , n} and σ a given permutation in Sn, the symmetric group on [n]....
AbstractWe consider noncentral Stirling numbers Snk(t) = (1k!)Δktn and give a combinatorial interpre...
AbstractThe generalized Stirling numbers introduced recently (Mansour and Schork, 2011 [5], Mansour ...
AbstractIn this paper, some relationships between the Stirling matrix, the Vandermonde matrix, the B...
AbstractNew q-analogs of Stirling numbers of the first and the second kind are derived from a poset ...
29 pagesAn ordered partition of [n]:={1,2,\ldots, n} is a sequence of its disjoint subsets whose uni...
29 pagesAn ordered partition of [n]:={1,2,\ldots, n} is a sequence of its disjoint subsets whose uni...
14 pagesThe Jacobi-Stirling numbers of the first and second kinds were introduced in 2006 in the spe...
14 pagesThe Jacobi-Stirling numbers of the first and second kinds were introduced in 2006 in the spe...
AbstractIn this paper we give a combinatorial interpretation of two classes of generalized Stirling ...
We prove that for any k = 1, . . . , 2n the 2-adic order of the Stirling number S(2n, k) of the seco...
AbstractWe first find inequalities between the Stirling numbers S(n, r) for fixed n, then introduce ...
AbstractThe Pascal-type matrices obtained from the Stirling numbers of the first kind s(n,k) and of ...
AbstractAn investigation is made of the polynomials fk(n) = S(n + k, n) and gk(n) = (−1)k s(n, n − k...
AbstractThe domains of the Stirling numbers of both kinds are extended from N2 to Z2. These extensio...
AbstractLet [n] be the set {1,2, … , n} and σ a given permutation in Sn, the symmetric group on [n]....
AbstractWe consider noncentral Stirling numbers Snk(t) = (1k!)Δktn and give a combinatorial interpre...
AbstractThe generalized Stirling numbers introduced recently (Mansour and Schork, 2011 [5], Mansour ...
AbstractIn this paper, some relationships between the Stirling matrix, the Vandermonde matrix, the B...
AbstractNew q-analogs of Stirling numbers of the first and the second kind are derived from a poset ...
29 pagesAn ordered partition of [n]:={1,2,\ldots, n} is a sequence of its disjoint subsets whose uni...
29 pagesAn ordered partition of [n]:={1,2,\ldots, n} is a sequence of its disjoint subsets whose uni...
14 pagesThe Jacobi-Stirling numbers of the first and second kinds were introduced in 2006 in the spe...
14 pagesThe Jacobi-Stirling numbers of the first and second kinds were introduced in 2006 in the spe...
AbstractIn this paper we give a combinatorial interpretation of two classes of generalized Stirling ...
We prove that for any k = 1, . . . , 2n the 2-adic order of the Stirling number S(2n, k) of the seco...
AbstractWe first find inequalities between the Stirling numbers S(n, r) for fixed n, then introduce ...
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