Integral Chow rings of modular compactifications of M1,n≤ 6

Abstract

For n≤ 6, we compute the integral Chow ring of every modular compactification of M1,n parametrising only Gorenstein curves with smooth, distinct markings. These include the Deligne--Mumford, Schubert, and Smyth compactifications, and many more. They can all be excised from the stack of log-canonically polarised Gorenstein curves. The Chow ring of the latter admits a simple, combinatorial description, which we compute by patching along a natural stratification by core level. We further deduce that all these modular compactifications satisfy the Chow-K\"unneth generation property, that the cycle class map is an isomorphism, and for n=4 we study whether the Getzler's relation hold integrally.