Hyperelliptic d-osculating covers and rational surfaces

Abstract

Let P1 and (X,q) denote, respectively, the projective line and a fixed elliptic curve marked at its origin, both defined over an algebraically closed field K of arbitrary characteristic p ≠2. We will consider all finite separable marked morphisms π :( ,p)→ (X,q), such that is a degree-2 cover of P1, ramified at the smooth point p ∈ . Canonically associated to π there is the Abel (rational) embedding of into its generalized Jacobian, Ap: Jac\,, and \0\ ⊂neq V1,p...⊂neq V g,p, the flag of hyperosculating planes to Ap() at Ap(p)∈ Jac\, (cf. 2.1. & 2.2.). On the other hand, we also have the homomorphism π: X \,, obtained by dualizing π. There is a smallest positive integer d such that the tangent line to π( X) is contained in Vd,p. We call it the osculating order of π. Studying, characterizing and constructing those with given osculating order d but maximal possible arithmetic genus, is one of the main issues. The other one, to which the first issue reduces, is the construction of all rational curves in a particular anticanonical rational surface associated to X (i.e.: a rational surface with an effective anticanonical divisor).