Equivariant principal bundles and logarithmic connections on toric varieties

Abstract

Let M be a smooth complex projective toric variety equipped with an action of a torus T, such that the complement D of the open T--orbit in M is a simple normal crossing divisor. Let G be a complex reductive affine algebraic group. We prove that an algebraic principal G--bundle EG M admits a T--equivariant structure if and only if EG admits a logarithmic connection singular over D. If EH M is a T-equivariant algebraic principal H--bundle, where H is any complex affine algebraic group, then EH in fact has a canonical integrable logarithmic connection singular over D.