AbstractA remarkably simple proof is presented for an interesting generalization of a combinatorial identity given recently by L. Vietoris [Monatsh. Math. 97 (1984) 157–160]. It is also shown how this general result can be extended further to hold true for basic (or q-) series
This paper presents binomial and factorial theorems on the binomial coefficients for combinatorial g...
This paper presents binomial and factorial theorems on the binomial coefficients for combinatorial g...
This paper presents a binomial and factorial theorem on the binomial coefficients for combinatorial ...
AbstractA remarkably simple proof is presented for an interesting generalization of a combinatorial ...
We provide combinatorial proofs of several of the q-series identities proved by Andrews, Jiménez-Urr...
This paper presents binomial theorems on combinatorial identities that are derived from the binomial...
This paper presents binomial theorems on combinatorial identities that are derived from the binomial...
This paper presents a new combinatorial identity on the binomial coefficients of combinatorial geome...
A general theorem for providing a class of combinatorial identities where the sum is over all the pa...
By a very simple argument, we prove that if l, m, n ∈ {0, 1, 2,...} then l� (−1) m−k � l m −
AbstractIn this paper, we present a method for obtaining a wide class of combinatorial identities. W...
Ruscheweyh and Salinas showed in 2004 the relationship of a celebrated theorem of Vietoris (1958) ab...
AbstractA general theorem for providing a class of combinatorial identities where the sum is over al...
This paper presents a lemma and its corollaries on the combinatorial geometric series and summation ...
This paper presents binomial and factorial theorems on the binomial coefficients for combinatorial g...
This paper presents binomial and factorial theorems on the binomial coefficients for combinatorial g...
This paper presents binomial and factorial theorems on the binomial coefficients for combinatorial g...
This paper presents a binomial and factorial theorem on the binomial coefficients for combinatorial ...
AbstractA remarkably simple proof is presented for an interesting generalization of a combinatorial ...
We provide combinatorial proofs of several of the q-series identities proved by Andrews, Jiménez-Urr...
This paper presents binomial theorems on combinatorial identities that are derived from the binomial...
This paper presents binomial theorems on combinatorial identities that are derived from the binomial...
This paper presents a new combinatorial identity on the binomial coefficients of combinatorial geome...
A general theorem for providing a class of combinatorial identities where the sum is over all the pa...
By a very simple argument, we prove that if l, m, n ∈ {0, 1, 2,...} then l� (−1) m−k � l m −
AbstractIn this paper, we present a method for obtaining a wide class of combinatorial identities. W...
Ruscheweyh and Salinas showed in 2004 the relationship of a celebrated theorem of Vietoris (1958) ab...
AbstractA general theorem for providing a class of combinatorial identities where the sum is over al...
This paper presents a lemma and its corollaries on the combinatorial geometric series and summation ...
This paper presents binomial and factorial theorems on the binomial coefficients for combinatorial g...
This paper presents binomial and factorial theorems on the binomial coefficients for combinatorial g...
This paper presents binomial and factorial theorems on the binomial coefficients for combinatorial g...
This paper presents a binomial and factorial theorem on the binomial coefficients for combinatorial ...
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