We present alternative, q-hypergeometric proofs of some polynomial analogues of classical q-series identities recently discovered by Alladi and Berkovich, and Berkovich and Garvan
AbstractA number of linear, bilinear, and multilinear generating functions are obtained here for var...
AbstractWe examine a pair of Rogers–Ramanujan type identities of Lebesgue, and give polynomial ident...
In this paper, we present a $q$-analogue of the polynomial reduction which was originally developed ...
We provide combinatorial proofs of several of the q-series identities proved by Andrews, Jiménez-Urr...
In this paper we present a short description of q-analogues of Gosper’s, Zeilberger’s, Petkovšek’s ...
AbstractWe give a fast elementary algorithm to get a small number n1 for an admissible q-proper-hype...
We use the q-binomial theorem to prove three new polynomial identities involving q-trinomial coecien...
We survey the applications of an elementary identity used by Euler in one of his proofs of the Penta...
AbstractA hypergeometric identity equating a triple sum to a single sum, originally found by Gelfand...
The q-disease A symptom of the q-disease---that scourge since Euler's times -- is that those a...
We give new proofs and explain the origin of several combinatorial identities of Fu and Lascoux, Dil...
AbstractWe introduce natural q-analogs of hypergeometric series well-poised in SU(n), the related hy...
The book provides a comprehensive introduction to the many aspects of the subject of basic hypergeom...
We give new proofs and explain the origin of several combinatorial identities of Fu and Lascoux, Dil...
A hypergeometric identity equating a triple sum to a single sum, originally found by Gelfand, Graev ...
AbstractA number of linear, bilinear, and multilinear generating functions are obtained here for var...
AbstractWe examine a pair of Rogers–Ramanujan type identities of Lebesgue, and give polynomial ident...
In this paper, we present a $q$-analogue of the polynomial reduction which was originally developed ...
We provide combinatorial proofs of several of the q-series identities proved by Andrews, Jiménez-Urr...
In this paper we present a short description of q-analogues of Gosper’s, Zeilberger’s, Petkovšek’s ...
AbstractWe give a fast elementary algorithm to get a small number n1 for an admissible q-proper-hype...
We use the q-binomial theorem to prove three new polynomial identities involving q-trinomial coecien...
We survey the applications of an elementary identity used by Euler in one of his proofs of the Penta...
AbstractA hypergeometric identity equating a triple sum to a single sum, originally found by Gelfand...
The q-disease A symptom of the q-disease---that scourge since Euler's times -- is that those a...
We give new proofs and explain the origin of several combinatorial identities of Fu and Lascoux, Dil...
AbstractWe introduce natural q-analogs of hypergeometric series well-poised in SU(n), the related hy...
The book provides a comprehensive introduction to the many aspects of the subject of basic hypergeom...
We give new proofs and explain the origin of several combinatorial identities of Fu and Lascoux, Dil...
A hypergeometric identity equating a triple sum to a single sum, originally found by Gelfand, Graev ...
AbstractA number of linear, bilinear, and multilinear generating functions are obtained here for var...
AbstractWe examine a pair of Rogers–Ramanujan type identities of Lebesgue, and give polynomial ident...
In this paper, we present a $q$-analogue of the polynomial reduction which was originally developed ...