Euler transformation for multiple q-hypergeometric series from wall-crossing formula of K-theoretic vortex partition function

Abstract

We show that transformation formulas of multiple q-hypergeometric series agree with wall-crossing formulas of K-theoretic vortex partition functions obtained by Hwang, Yi and the author Hwang:2017kmk. For the vortex partition function in 3d N=2 gauge theory, we show that the wall-crossing formula agrees with the Kajihara transformation kajihara2004euler. For the vortex partition function in 3d N=4 gauge theory, we show that the wall-crossing formula agrees with the transformation formula by Halln\"as, Langmann, Noumi and Rosengren Hallns2022. Since the K-theoretic vortex partition functions are related with indices such as the t-genus of the handsaw quiver variety, we discuss geometric interpretation of Euler transformations in terms of wall-crossing formulas of handsaw quiver variety.