On Parameterizations of plane rational curves and their syzygies

Abstract

Let C be a plane rational curve of degree d and p: C → C its normalization. We are interested in the splitting type (a,b) of C, where OP1(-a-d) OP1(-b-d) gives the syzigies of the ideal (f0,f1,f2)⊂ K[s,t], and (f0,f1,f2) is a parameterization of C. We want to describe in which cases (a,b)=(k,d-k) (2k≤ d), via a geometric description; namely we show that (a,b)=(k,d-k) if and only if C is the projection of a rational curve on a rational normal surface in Pk+1.