Secant loci of scrolls over curves

Abstract

Given a curve C and a linear system on C, the secant locus Vee-f( ) parametrises effective divisors of degree e which impose at most e-f conditions on . For E C a vector bundle of rank r, we define determinantal subschemes Hee-f ( ) ⊂eq Hilbe ( P E ) and Qee-f (V) ⊂eq Quot0, e ( E* ) which generalise Vee-f ( ), giving several examples. We describe the Zariski tangent spaces of Qee-f (V), and give examples showing that smoothness of Qee-f (V) is not necessarily controlled by injectivity of a Petri map. We generalise the Abel--Jacobi map and the notion of linear series to the context of Quot schemes. We give some sufficient conditions for nonemptiness of generalised secant loci, and a criterion in the complete case when f = 1 in terms of the Segre invariant s1 (E). This leads to a geometric characterisation of semistability similar to that in arxiv:1812.00706. Using these ideas, we also give a partial answer to a question of Lange on very ampleness of OP E (1), and show that for any curve, Qee-1 (V) is either empty or of the expected dimension for sufficiently general E and V. When Qee-1 (V) has and attains expected dimension zero, we use formulas of Oprea--Pandharipande and Stark to enumerate Qee-1 (V). We mention several possible avenues of further investigation.