Upper bounds for the dimension of tori acting on GKM manifolds

Abstract

The aim of this paper is to give an upper bound for the dimension of a torus T which acts on a GKM manifold M effectively. In order to do that, we introduce a free abelian group of finite rank, denoted by A(,α,∇), from an (abstract) (m,n)-type GKM graph (,α,∇). Here, an (m,n)-type GKM graph is the GKM graph induced from a 2m-dimensional GKM manifold M2m with an effective n-dimensional torus Tn-action, say (M2m,Tn). Then it is shown that A(,α,∇) has rank (> n) if and only if there exists an (m,)-type GKM graph (,α,∇) which is an extension of (,α,∇). Using this necessarily and sufficient condition, we prove that the rank of A(,α,∇) for the GKM graph of (M2m,Tn) gives an upper bound for the dimension of a torus which can act on M2m effectively. As an application, we compute the rank of A(,α,∇) of the complex Grassmannian of 2-planes G2(Cn+2) with some effective Tn+1-action, and prove that the Tn+1-action on G2(Cn+2) is the maximal effective torus action.