AbstractIn this brief note, we give a combinatorial proof of a variation of Gauss’s q-binomial theorem, and we determine arithmetic properties of the overpartition function modulo 8
In this article we exhibit new explicit families of congruences for the overpartition function, maki...
A thesis submitted to the Faculty of Science, University of the Witwatersrand, Johannesburg, in ful...
AbstractWe study a class of well-poised basic hypergeometric series J˜k,i(a;x;q), interpreting these...
AbstractIn this brief note, we give a combinatorial proof of a variation of Gauss’s q-binomial theor...
We study new classes of overpartitions of numbers based on the properties of non-overlined parts. Se...
AbstractIn a recent paper, Fortin et al. (Jagged Partitions, arXivmath. CO/0310079, 2003) found cong...
AbstractWe show that the formalism of overpartitions gives a simple involution for the product defin...
AbstractAn overpartition of n is a non-increasing sequence of positive integers whose sum is n in wh...
In recent work, Bringmann et al. used q-difference equations to compute a two-variable q-hypergeomet...
The primary focus of this paper is overpartitions, a type of partition that plays a significant role...
International audienceWe investigate class of well-poised basic hypergeometric series $\tilde{J}_{k,...
We obtain a three-parameter q-series identity that generalizes two results of Chan and Mao. By speci...
AbstractTheorems in the theory of partitions are closely related to basic hypergeometric series. Som...
AbstractWe extend partition-theoretic work of Andrews, Bressoud, and Burge to overpartitions, defini...
In this paper, we study various arithmetic properties of the function p¯¯¯2,k(n), which denotes the ...
In this article we exhibit new explicit families of congruences for the overpartition function, maki...
A thesis submitted to the Faculty of Science, University of the Witwatersrand, Johannesburg, in ful...
AbstractWe study a class of well-poised basic hypergeometric series J˜k,i(a;x;q), interpreting these...
AbstractIn this brief note, we give a combinatorial proof of a variation of Gauss’s q-binomial theor...
We study new classes of overpartitions of numbers based on the properties of non-overlined parts. Se...
AbstractIn a recent paper, Fortin et al. (Jagged Partitions, arXivmath. CO/0310079, 2003) found cong...
AbstractWe show that the formalism of overpartitions gives a simple involution for the product defin...
AbstractAn overpartition of n is a non-increasing sequence of positive integers whose sum is n in wh...
In recent work, Bringmann et al. used q-difference equations to compute a two-variable q-hypergeomet...
The primary focus of this paper is overpartitions, a type of partition that plays a significant role...
International audienceWe investigate class of well-poised basic hypergeometric series $\tilde{J}_{k,...
We obtain a three-parameter q-series identity that generalizes two results of Chan and Mao. By speci...
AbstractTheorems in the theory of partitions are closely related to basic hypergeometric series. Som...
AbstractWe extend partition-theoretic work of Andrews, Bressoud, and Burge to overpartitions, defini...
In this paper, we study various arithmetic properties of the function p¯¯¯2,k(n), which denotes the ...
In this article we exhibit new explicit families of congruences for the overpartition function, maki...
A thesis submitted to the Faculty of Science, University of the Witwatersrand, Johannesburg, in ful...
AbstractWe study a class of well-poised basic hypergeometric series J˜k,i(a;x;q), interpreting these...
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