Moduli of curves as moduli of A-infinity structures

Abstract

We define and study the stack Uns,ag,g of (possibly singular) projective curves of arithmetic genus g with g smooth marked points forming an ample non-special divisor. We define an explicit closed embedding of a natural Gmg-torsor over Uns,ag,g into an affine space and give explicit equations of the universal curve (away from characteristics 2 and 3). This construction can be viewed as a generalization of the Weierstrass cubic and the j-invariant of an elliptic curve to the case g>1. Our main result is that in characteristics different from 2 and 3 our moduli space of non-special curves is isomorphic to the moduli space of minimal A-infinity structures on a certain finite-dimensional graded associative algebra Eg (introduced in arXiv:1208.6332). We show how to compute explicitly the A-infinity structure associated with a curve (C,p1,...,pg) in terms of certain canonical generators of the algebra of functions on C-\p1,...,pg\ and canonical formal parameters at the marked points. We study the GIT quotients associated with our representation of Uns,ag,g as the quotient of an affine scheme by Gmg and show that some of the corresponding stack quotients give modular compactifications of Mg,g in the sense of arXiv:0902.3690. We also consider an analogous picture for curves of arithmetic genus 0 with n marked points which gives a new presentation of the moduli space of -stable curves (also known as Boggi-stable curves) and its interpretation in terms of A∞-structures.