summary:In this note, we estimate the distance between two $q$-nomial coefficients $\bigl \lvert \binom {n}{k}_q-\binom {n'}{k'}_q\bigr \rvert $, where $(n,k)\ne (n',k')$ and $q\ge 2$ is an integer
Let S = (s1, s2, . . .) be any sequence of nonnegative integers and let Sk = ∑ki=1si. We then define...
AbstractIn this paper, we give an extension of the q-beta integral. Applications of the extension ar...
AbstractIt is known that∑k=0∞(2kk)(2k+1)4k=π2and∑k=0∞(2kk)(2k+1)16k=π3. In this paper we obtain thei...
AbstractThis note is a continuation of a paper by the same authors that appeared in 2002 in the same...
AbstractFor m>n≥0 and 1≤d≤m, it is shown that the q-Euler number E2m(q) is congruent to qm−nE2n(q)mo...
AbstractWe present some variations on the Greene–Krammerʼs identity which involve q-Catalan numbers....
AbstractIn this paper we establish a q-analogue of a congruence of Sun concerning the products of bi...
AbstractRamanujan recorded additive formulae of theta functions that are related to modular equation...
AbstractWe introduce multiple q-Mahler measures and we calculate some specific examples, where multi...
In this paper, we introduce a new class of meromorphic functions, using the exponent $ q $-derivati...
By applying multiplicate forms of the Carlitz inverse series relations to the $q$-Pfaff-Saalschtz su...
AbstractIn this paper, we prove a new identity for the product of two partial theta functions. An im...
AbstractWe investigate some arithmetic properties of the q-Fibonacci numbers and the q-Pell numbers
2000 Mathematics Subject Classification: 33D60, 26A33, 33C60The present paper envisages the applicat...
AbstractIn 1992, Strauss, Shallit and Zagier proved that for any positive integer a,∑k=03a−1(2kk)≡0(...
Let S = (s1, s2, . . .) be any sequence of nonnegative integers and let Sk = ∑ki=1si. We then define...
AbstractIn this paper, we give an extension of the q-beta integral. Applications of the extension ar...
AbstractIt is known that∑k=0∞(2kk)(2k+1)4k=π2and∑k=0∞(2kk)(2k+1)16k=π3. In this paper we obtain thei...
AbstractThis note is a continuation of a paper by the same authors that appeared in 2002 in the same...
AbstractFor m>n≥0 and 1≤d≤m, it is shown that the q-Euler number E2m(q) is congruent to qm−nE2n(q)mo...
AbstractWe present some variations on the Greene–Krammerʼs identity which involve q-Catalan numbers....
AbstractIn this paper we establish a q-analogue of a congruence of Sun concerning the products of bi...
AbstractRamanujan recorded additive formulae of theta functions that are related to modular equation...
AbstractWe introduce multiple q-Mahler measures and we calculate some specific examples, where multi...
In this paper, we introduce a new class of meromorphic functions, using the exponent $ q $-derivati...
By applying multiplicate forms of the Carlitz inverse series relations to the $q$-Pfaff-Saalschtz su...
AbstractIn this paper, we prove a new identity for the product of two partial theta functions. An im...
AbstractWe investigate some arithmetic properties of the q-Fibonacci numbers and the q-Pell numbers
2000 Mathematics Subject Classification: 33D60, 26A33, 33C60The present paper envisages the applicat...
AbstractIn 1992, Strauss, Shallit and Zagier proved that for any positive integer a,∑k=03a−1(2kk)≡0(...
Let S = (s1, s2, . . .) be any sequence of nonnegative integers and let Sk = ∑ki=1si. We then define...
AbstractIn this paper, we give an extension of the q-beta integral. Applications of the extension ar...
AbstractIt is known that∑k=0∞(2kk)(2k+1)4k=π2and∑k=0∞(2kk)(2k+1)16k=π3. In this paper we obtain thei...
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