On degenerations of projective varieties to complexity-one T-varieties

Abstract

Let R be a positively graded finitely generated k-domain with Krull dimension d+1. We show that there is a homogeneous valuation v: R \0\ Zd of rank d such that the associated graded grv(R) is finitely generated. This then implies that any polarized d-dimensional projective variety X has a flat deformation over A1, with reduced and irreducible fibers, to a polarized projective complexity-one T-variety (i.e. a variety with a faithful action of a (d-1)-dimensional torus T). As an application we conclude that any d-dimensional complex smooth projective variety X equipped with an integral K\"ahler form has a proper (d-1)-dimensional Hamiltonian torus action on an open dense subset that extends continuously to all of X.