AbstractUsing Lie theory, Stefano Capparelli conjectured an interesting Rogers–Ramanujan type partition identity in his 1988 Rutgers PhD thesis. The first proof was given by George Andrews, using combinatorial methods. Later, Capparelli was able to provide a Lie theoretic proof.Most combinatorial Rogers–Ramanujan type identities (e.g., the Göllnitz–Gordon identities, Gordon's combinatorial generalization of the Rogers–Ramanujan identities, etc.) have an analytic counterpart. The main purpose of this paper is to provide two new series representations for the infinite product associated with Capparelli's conjecture. Some additional related identities, including new infinite families are also presented
Using a pair of two variable series-product identities recorded by Ramanujan in the lost notebook as...
AbstractBy applying the bisection and trisection method to Jacobi's triple product identity, we esta...
AbstractIn a recent paper by the authors, a bounded version of Göllnitz's (big) partition theorem wa...
AbstractUsing Lie theory, Stefano Capparelli conjectured an interesting Rogers–Ramanujan type partit...
AbstractBeginning in 1893, L.J. Rogers produced a collection of papers in which he considered series...
International audienceUsing jagged overpartitions, we give three generalizations of a weighted word ...
AbstractIn this paper following some ideas introduced by Andrews (Combinatorics and Ramanujan's “los...
AbstractWe provide a bijective map from the partitions enumerated by the series side of the Rogers–S...
AbstractWe give a combinatorial proof of the first Rogers–Ramanujan identity by using two symmetries...
AbstractIn this paper we revisit a 1987 question of Rabbi Ehrenpreis. Among many things, we provide ...
AbstractRecently Andrews proposed a problem of finding a combinatorial proof of an identity on the q...
AbstractWe define the nonic Rogers–Ramanujan-type functions D(q), E(q) and F(q) and establish severa...
AbstractParticle seas were introduced by Claude Itzykson to give a direct combinatorial proof of the...
AbstractWe prove an identity for Hall–Littlewood symmetric functions labelled by the Lie algebra A2....
AbstractThe purpose of this paper is to introduce the RRtools and recpf Maple packages which were de...
Using a pair of two variable series-product identities recorded by Ramanujan in the lost notebook as...
AbstractBy applying the bisection and trisection method to Jacobi's triple product identity, we esta...
AbstractIn a recent paper by the authors, a bounded version of Göllnitz's (big) partition theorem wa...
AbstractUsing Lie theory, Stefano Capparelli conjectured an interesting Rogers–Ramanujan type partit...
AbstractBeginning in 1893, L.J. Rogers produced a collection of papers in which he considered series...
International audienceUsing jagged overpartitions, we give three generalizations of a weighted word ...
AbstractIn this paper following some ideas introduced by Andrews (Combinatorics and Ramanujan's “los...
AbstractWe provide a bijective map from the partitions enumerated by the series side of the Rogers–S...
AbstractWe give a combinatorial proof of the first Rogers–Ramanujan identity by using two symmetries...
AbstractIn this paper we revisit a 1987 question of Rabbi Ehrenpreis. Among many things, we provide ...
AbstractRecently Andrews proposed a problem of finding a combinatorial proof of an identity on the q...
AbstractWe define the nonic Rogers–Ramanujan-type functions D(q), E(q) and F(q) and establish severa...
AbstractParticle seas were introduced by Claude Itzykson to give a direct combinatorial proof of the...
AbstractWe prove an identity for Hall–Littlewood symmetric functions labelled by the Lie algebra A2....
AbstractThe purpose of this paper is to introduce the RRtools and recpf Maple packages which were de...
Using a pair of two variable series-product identities recorded by Ramanujan in the lost notebook as...
AbstractBy applying the bisection and trisection method to Jacobi's triple product identity, we esta...
AbstractIn a recent paper by the authors, a bounded version of Göllnitz's (big) partition theorem wa...