Rev\etements hyperelliptiques d-osculateurs et solitons elliptiques de la hi\'erarchie KdV

Abstract

Let d be a positive integer, K an algebraically closed field of characteristic 0 and X an elliptic curve defined over K. We study the hyperelliptic curves equipped with a projection over X, such that the natural image of X in the Jacobian of the curve osculates to order d to the embedding of the curve, at a Weierstrass point. We construct (d-1)-dimensional families of such curves, of arbitrary big genus g, obtaining, in particular, (g+d-1)-dimensional families of solutions of the KdV hierarchy, doubly periodic with respect to the d-th KdV flow.