Factorisation and holomorphic blocks in 4d

Abstract

We study N=1 theories on Hermitian manifolds of the form M4=S1xM3 with M3 a U(1) fibration over S2, and their 3d N=2 reductions. These manifolds admit an Heegaard-like decomposition in solid tori D2xT2 and D2xS1. We prove that when the 4d and 3d anomalies are cancelled the matrix integrands in the Coulomb branch partition functions can be factorised in terms of 1-loop factors on D2xT2 and D2xS1 respectively. By evaluating the Coulomb branch matrix integrals we show that the 4d and 3d partition functions can be expressed as sums of products of 4d and 3d holomorphic blocks.