Injection dimensions of projective varieties

Abstract

We explore injective morphisms from complex projective varieties X to projective spaces Ps of small dimension. Based on connectedness theorems, we prove that the ambient dimension s needs to be at least 2 X for all injections given by a linear subsystem of a strict power of a line bundle. Using this, we give an example where the smallest ambient dimension cannot be attained from any embedding X Pn by linear projections. Our focus then lies on X = Pn1 × … × Pnr, in which case there is a close connection to secant loci of Segre--Veronese varieties and the rank 2 geometry of partially symmetric tensors, as well as on X = P(q0,…,qn), which is linked to separating invariants for representations of finite cyclic groups. We showcase three techniques for constructing injections X P2 X in specific cases.