On the Chow and cohomology rings of moduli spaces of stable curves

Abstract

In this paper, we ask: for which (g, n) is the rational Chow or cohomology ring of Mg,n generated by tautological classes? This question has been fully answered in genus 0 by Keel (the Chow and cohomology rings are tautological for all n) and genus 1 by Belorousski (the rings are tautological if and only if n ≤ 10). For g ≥ 2, work of van Zelm shows the Chow and cohomology rings are not tautological once 2g + n ≥ 24, leaving finitely many open cases. Here, we prove that the Chow and cohomology rings of Mg,n are isomorphic and generated by tautological classes for g = 2 and n ≤ 9 and for 3 ≤ g ≤ 7 and 2g + n ≤ 14. For such (g, n), this implies that the tautological ring is Gorenstein and Mg,n has polynomial point count.