On 3-folds having a holomorphic torus action with 6 fixed points

Abstract

We study 3-folds with an action of a algebraic torus T and finite fixed point set. In particular, assuming the torus action has (exactly) 6 fixed points we show that aside from Mori fibre spaces, the topology of such spaces is strongly restricted. For T= C* we prove that there are two explicit infinite families plus a finite number of exceptional cases. For T = C* × C* there are 2 exceptional cases which are described explicitly.