Torus manifolds with non-abelian symmetries

Abstract

Let (G) be a connected compact non-abelian Lie-group and (T) a maximal torus of (G). A torus manifold with (G)-action is defined to be a smooth connected closed oriented manifold of dimension (2 T) with an almost effective action of (G) such that (MT≠ ). We show that if there is a torus manifold (M) with (G)-action then the action of a finite covering group of (G) factors through (G=Π SU(li+1)×Π SO(2li+1)× Π SO(2li)× Tl0). The action of (G) on (M) restricts to an action of (G'=Π SU(li+1)×Π SO(2li+1)× Π U(li)× Tl0) which has the same orbits as the (G)-action. We define invariants of torus manifolds with (G)-action which determine their (G')-equivariant diffeomorphism type. We call these invariants admissible 5-tuples. A simply connected torus manifold with (G)-action is determined by its admissible 5-tuple up to (G)-equivariant diffeomorphism. Furthermore we prove that all admissible 5-tuples may be realised by torus manifolds with (G")-action where (G") is a finite covering group of (G').