On the Andrews-Zagier asymptotics for partitions without sequences

Kathrin Bringmann; Robert Rhoades; Daniel Parry

arXiv:1511.07855·math.NT·May 16, 2017

On the Andrews-Zagier asymptotics for partitions without sequences

Kathrin Bringmann, Robert Rhoades, Daniel Parry

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TL;DR

This paper investigates the asymptotic behavior of the Andrews G_k(q) function as q approaches 1, providing insights into the distribution of partitions without sequences.

Contribution

The paper derives the asymptotic formula for Andrews G_k(q) as q tends to 1, extending understanding of partition functions without sequences.

Findings

01

Asymptotic formula for G_k(q) as q→1

02

Enhanced understanding of partitions without sequences

03

Mathematical techniques for asymptotic analysis

Abstract

We establish the asymptotic behavior of the Andrews $G_{k} (q)$ function as $q \to 1.$

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