Add to ORKGSang, Shi and Yee, in 2020, found overpartition analogs of Andrews' results involving parity in Rogers-Ramanujan-Gordon identities. Their result partially answered an open question of Andrews'. The open question was to involve parity in overpartition identities. We extend Sang, Shi, and Yee's work to arbitrary moduli, and also provide a missing case in their identities. We also unify proofs of Rogers-Ramanujan-Gordon identities for overpartitions due to Lovejoy and Chen et.al.; Sang, Shi, and Yee's results; and ours. Although verification type proofs are given for brevity, a construction of series as solutions of functional equations between partition generating functions is sketched.Comment: 18 page
AbstractIn this paper a partition theorem is proved which contains the Rogers-Ramanujan identities a...
AbstractIn 1974, Andrews discovered the generating function for the partitions of n considered in a ...
We propose a method to construct a variety of partition identities at once. The main application is ...
Sang, Shi and Yee, in 2020, found overpartition analogs of Andrews' results involving parity in Roge...
Sang, Shi and Yee, in 2020, found overpartition analogs of Andrews' results involving parity in Roge...
Sang, Shi and Yee, in 2020, found overpartition analogs of Andrews' results involving parity in Roge...
Sang, Shi and Yee, in 2020, found overpartition analogs of Andrews' results involving parity in Roge...
Corteel, Lovejoy and Mallet concluded their paper \An extension to overpartitions of the Rogers-Ram...
We construct a family of partition identities which contain the following identities: Rogers-Ramanuj...
We construct a family of partition identities which contain the following identities: Rogers-Ramanuj...
In 1980, Bressoud conjectured a combinatorial identity $A_j=B_j$ for $j=0$ or $1$, where the functio...
We extend partition-theoretic work of Andrews, Bressoud, and Burge to overpartitions, defining the n...
A partition of a nonnegative integer is a way of writing this number as a sum of positive integers w...
The theory of integer partitions is a field of much investigative interest to mathematicians and phy...
The well-known Rogers-Ramanujan identities have been a rich source of mathematical study over the la...
AbstractIn this paper a partition theorem is proved which contains the Rogers-Ramanujan identities a...
AbstractIn 1974, Andrews discovered the generating function for the partitions of n considered in a ...
We propose a method to construct a variety of partition identities at once. The main application is ...
Sang, Shi and Yee, in 2020, found overpartition analogs of Andrews' results involving parity in Roge...
Sang, Shi and Yee, in 2020, found overpartition analogs of Andrews' results involving parity in Roge...
Sang, Shi and Yee, in 2020, found overpartition analogs of Andrews' results involving parity in Roge...
Sang, Shi and Yee, in 2020, found overpartition analogs of Andrews' results involving parity in Roge...
Corteel, Lovejoy and Mallet concluded their paper \An extension to overpartitions of the Rogers-Ram...
We construct a family of partition identities which contain the following identities: Rogers-Ramanuj...
We construct a family of partition identities which contain the following identities: Rogers-Ramanuj...
In 1980, Bressoud conjectured a combinatorial identity $A_j=B_j$ for $j=0$ or $1$, where the functio...
We extend partition-theoretic work of Andrews, Bressoud, and Burge to overpartitions, defining the n...
A partition of a nonnegative integer is a way of writing this number as a sum of positive integers w...
The theory of integer partitions is a field of much investigative interest to mathematicians and phy...
The well-known Rogers-Ramanujan identities have been a rich source of mathematical study over the la...
AbstractIn this paper a partition theorem is proved which contains the Rogers-Ramanujan identities a...
AbstractIn 1974, Andrews discovered the generating function for the partitions of n considered in a ...
We propose a method to construct a variety of partition identities at once. The main application is ...