Partition Inequalities and Applications to Sum-Product Conjectures of Kanade-Russell

TL;DR

This paper proves partition inequalities related to sum-product conjectures of Kanade-Russell, using combinatorial methods and Andrews' Anti-telescoping Technique, providing evidence for these conjectures.

Contribution

It introduces new combinatorial proofs of partition inequalities and applies Andrews' method to support Kanade-Russell's sum-product conjectures.

Findings

Proved nonnegativity of certain partition-related coefficients.

Extended previous results by Berkovich-Garvan and McLaughlin.

Provided evidence supporting Kanade-Russell conjectures.

Abstract

We consider differences of one- and two-variable finite products and provide combinatorial proofs of the nonnegativity of certain coefficients. Since the products may be interpreted as generating functions for certain integer partitions, this amounts to showing a partition inequality. This extends results due to Berkovich-Garvan and McLaughlin. We then apply the first inequality and Andrews' Anti-telescoping Method to give a solution to an 'Ehrenpreis Problem' for recently conjectured sum-product identities of Kanade- Russell. That is, we provide some evidence for Kanade-Russell's conjectures by showing nonnegativity of coefficients in differences of product-sides as Andrews-Baxter and Kadell did for the product sides of the Rogers-Ramanujan identities.