Syzygies of canonical ribbons on higher genus curves

Abstract

We study the syzygies of the canonical embedding of a ribbon C on a curve C of genus g ≥ 1. We show that the linear series Clifford index and the resolution Clifford index are equal for a general ribbon of arithmetic genus pa on a general curve of genus g with pa ≥ max\3g+7, 6g-4\. Among non-general ribbons, the case of split ribbons is particularly interesting. Equality of the two Clifford indices for a split ribbon is related to the gonality conjecture for C and it implies Green's conjecture for all double covers C' of C with g(C') ≥ max\3g+2, 6g-4\. We reduce it to the vanishing of certain Koszul cohomology groups of an auxiliary module of syzygies associated to C, which may be of independent interest.

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