Add to ORKGWOS: 000383001400001In this paper, by means of q-difference operator we derive q-analogue for several well known results for harmonic numbers. Also we give some identities concerning q-hyperharmonic numbers
Abstract In this paper, we present some identities relating the hyperharmonic, the Daehee and the de...
AbstractIn the present paper combinatorial identities involving q-dual sequences or polynomials with...
In this paper we present a short description of q-analogues of Gosper’s, Zeilberger’s, Petkovšek’s ...
Hyperharmonic numbers arise by taking repeated partial sums of harmonic numbers. These numbers can b...
Hyperharmonic numbers arise by taking repeated partial sums of harmonic numbers. These numbers can b...
Abstract In this paper, we establish some relations involving q-Euler type sums, q-harmonic numbers ...
We provide combinatorial proofs of several of the q-series identities proved by Andrews, Jiménez-Urr...
In this paper, we derive several combinatorial identities involving the q-derangement numbers (for t...
AbstractPaule and Schneider (2003) [3], and Chu (Chu and Donno) (2005) [1] gave a family of wonderfu...
The master’s thesis discusses harmonic numbers These prove to be very useful in the field of number t...
Hyperharmonic numbers were introduced by Conway and Guy (The Book of Numbers, Copernicus, New York, ...
This is a continuation of [19], where we presented an extension of the q-hypergeometric function wit...
We present alternative, q-hypergeometric proofs of some polynomial analogues of classical q-series i...
In this paper, we study the theory of the harmonic and the hyperharmonic Fibonacci numbers. Also, we...
AbstractThe paper contains a combinatorial interpretation of the q-Eulerian numbers suggested by H. ...
Abstract In this paper, we present some identities relating the hyperharmonic, the Daehee and the de...
AbstractIn the present paper combinatorial identities involving q-dual sequences or polynomials with...
In this paper we present a short description of q-analogues of Gosper’s, Zeilberger’s, Petkovšek’s ...
Hyperharmonic numbers arise by taking repeated partial sums of harmonic numbers. These numbers can b...
Hyperharmonic numbers arise by taking repeated partial sums of harmonic numbers. These numbers can b...
Abstract In this paper, we establish some relations involving q-Euler type sums, q-harmonic numbers ...
We provide combinatorial proofs of several of the q-series identities proved by Andrews, Jiménez-Urr...
In this paper, we derive several combinatorial identities involving the q-derangement numbers (for t...
AbstractPaule and Schneider (2003) [3], and Chu (Chu and Donno) (2005) [1] gave a family of wonderfu...
The master’s thesis discusses harmonic numbers These prove to be very useful in the field of number t...
Hyperharmonic numbers were introduced by Conway and Guy (The Book of Numbers, Copernicus, New York, ...
This is a continuation of [19], where we presented an extension of the q-hypergeometric function wit...
We present alternative, q-hypergeometric proofs of some polynomial analogues of classical q-series i...
In this paper, we study the theory of the harmonic and the hyperharmonic Fibonacci numbers. Also, we...
AbstractThe paper contains a combinatorial interpretation of the q-Eulerian numbers suggested by H. ...
Abstract In this paper, we present some identities relating the hyperharmonic, the Daehee and the de...
AbstractIn the present paper combinatorial identities involving q-dual sequences or polynomials with...
In this paper we present a short description of q-analogues of Gosper’s, Zeilberger’s, Petkovšek’s ...