A-infinity algebras associated with curves and rational functions on Mg,g. I

Abstract

We consider the natural A-infinity structure on the Ext-algebra Ext*(G,G) associated with the coherent sheaf G= OC Op1... Opn on a smooth projective curve C, where p1,...,pn∈ C are distinct points. We study the homotopy class of the product m3. Assuming that h0(p1+...+pn)=1 we prove that m3 is homotopic to zero if and only if C is hyperelliptic and the points pi are Weierstrass points. In the latter case we show that m4 is not homotopic to zero, provided the genus of C is at least 2. In the case n=g we prove that the A-infinity structure is determined uniquely (up to homotopy) by the products mi with i 6. Also, in this case we study the rational map Mg,g Ag2-2g associated with the homotopy class of m3. We prove that for g 6 it is birational onto its image, while for g 5 it is dominant. We also give an interpretation of this map in terms of tangents to C in the canonical embedding and in the projective embedding given by the linear series |2(p1+...+pg)|.