Factorisation of N = 2 theories on the squashed 3-sphere

Abstract

Partition functions of N=2 theories on the squashed 3-sphere have been recently shown to localise to matrix integrals. By explicitly evaluating the matrix integral we show that abelian partition functions can be expressed as a sum of products of two blocks. We identify the first block with the partition function of the vortex theory, with equivariant parameter hbar=2 Pi i b2, defined on R2 x S1 corresponding to the b->0 degeneration of the ellipsoid. The second block gives the partition function of the vortex theory with equivariant parameter hbarL=2 Pi i/b2, on the dual R2 x S1 corresponding to the 1/b ->0 degeneration. The ellipsoid partition appears to provide the hbar -> hbarL modular invariant non-perturbative completion of the vortex theory.