AbstractWe prove Q-linear independence results for the values of the q-seriesTqt(z)=∑ν=0∞q−tν(ν+1)/2zνandΘ(q−t,z)=∑ν=−∞∞q−tν2zν at different rational points z≠0 and with different positive integer parameters t, where q∈Z∖{0,±1}
AbstractWe use an upper bound on the number of zeros of sparse polynomials over a finite field Fq to...
As a unified approach, Jacobi\u27s triple product identity will be utilized to derive theta function...
In this paper, we generalize the Gessel-Xin's Laurent series method and show it is related to the th...
AbstractWe give an explicit p-adic expansion of ∑∗j=1npqj/[j]r as a power series in n which generali...
AbstractLet σk(n) denote the sum of the k-th powers of the positive divisors of n. Erdős and Kac con...
AbstractIn 1992, Strauss, Shallit and Zagier proved that for any positive integer a,∑k=03a−1(2kk)≡0(...
By applying multiplicate forms of the Carlitz inverse series relations to the $q$-Pfaff-Saalschtz su...
AbstractWe introduce multiple q-Mahler measures and we calculate some specific examples, where multi...
summary:In this note, we estimate the distance between two $q$-nomial coefficients $\bigl \lvert \bi...
AbstractIn this paper, we give some explicit evaluations of multiple zeta-star values which are rati...
In this paper, we obtain order equalities for the kth order Lq(T)-moduli of smoothness ωk(f;δ)q in t...
AbstractIn this paper, we use the q-Chu–Vandermonde formula to derive a recurring q-integral formula...
AbstractWe define two finite q-analogs of certain multiple harmonic series with an arbitrary number ...
We prove a new relation for the multiple q-zeta values (MqZV’s). It is aq-analogue of the Ohno-Zagie...
AbstractBailey's fundamental identity of bilateral well-poised ψ66-series is utilized to present sho...
AbstractWe use an upper bound on the number of zeros of sparse polynomials over a finite field Fq to...
As a unified approach, Jacobi\u27s triple product identity will be utilized to derive theta function...
In this paper, we generalize the Gessel-Xin's Laurent series method and show it is related to the th...
AbstractWe give an explicit p-adic expansion of ∑∗j=1npqj/[j]r as a power series in n which generali...
AbstractLet σk(n) denote the sum of the k-th powers of the positive divisors of n. Erdős and Kac con...
AbstractIn 1992, Strauss, Shallit and Zagier proved that for any positive integer a,∑k=03a−1(2kk)≡0(...
By applying multiplicate forms of the Carlitz inverse series relations to the $q$-Pfaff-Saalschtz su...
AbstractWe introduce multiple q-Mahler measures and we calculate some specific examples, where multi...
summary:In this note, we estimate the distance between two $q$-nomial coefficients $\bigl \lvert \bi...
AbstractIn this paper, we give some explicit evaluations of multiple zeta-star values which are rati...
In this paper, we obtain order equalities for the kth order Lq(T)-moduli of smoothness ωk(f;δ)q in t...
AbstractIn this paper, we use the q-Chu–Vandermonde formula to derive a recurring q-integral formula...
AbstractWe define two finite q-analogs of certain multiple harmonic series with an arbitrary number ...
We prove a new relation for the multiple q-zeta values (MqZV’s). It is aq-analogue of the Ohno-Zagie...
AbstractBailey's fundamental identity of bilateral well-poised ψ66-series is utilized to present sho...
AbstractWe use an upper bound on the number of zeros of sparse polynomials over a finite field Fq to...
As a unified approach, Jacobi\u27s triple product identity will be utilized to derive theta function...
In this paper, we generalize the Gessel-Xin's Laurent series method and show it is related to the th...