The canonical module of GT-varieties and the normal bundle of RL-varieties

Abstract

In this paper, we study the geometry of GT-varieties Xd with group a finite cyclic group ⊂ GL(n+1,K) of order d. We prove that the homogeneous ideal I(Xd) of Xd is generated by binomials of degree at most 3 and we provide examples reaching this bound. We give a combinatorial description of the canonical module of the homogeneous coordinate ring of Xd and we show that it is generated by monomial invariants of of degree d and 2d. This allows us to characterize the Castelnuovo-Mumford regularity of the homogeneous coordinate ring of Xd. Finally, we compute the cohomology table of the normal bundle of the so called RL-varieties. They are projections of the Veronese variety d(Pn) ⊂ Pn+dn-1 which naturally arise from level GT-varieties.