Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
4655027 | Journal of Combinatorial Theory, Series A | 2017 | 28 Pages |
Abstract
In 1968 and 1969, Andrews proved two partition theorems of the Rogers–Ramanujan type which generalise Schur's celebrated partition identity (1926). Andrews' two generalisations of Schur's theorem went on to become two of the most influential results in the theory of partitions, finding applications in combinatorics, representation theory and quantum algebra. In a recent paper, the author generalised the first of these theorems to overpartitions, using a new technique which consists in going back and forth between q-difference equations on generating functions and recurrence equations on their coefficients. Here, using a similar method, we generalise the second theorem of Andrews to overpartitions.
Related Topics
Physical Sciences and Engineering
Mathematics
Discrete Mathematics and Combinatorics
Authors
Jehanne Dousse,