Relations on Mbarg,n via 3-spin structures

Abstract

Witten's class on the moduli space of 3-spin curves defines a (non-semisimple) cohomological field theory. After a canonical modification, we construct an associated semisimple CohFT with a non-trivial vanishing property obtained from the homogeneity of Witten's class. Using the classification of semisimple CohFTs by Givental-Teleman, we derive two main results. The first is an explicit formula in the tautological ring of Mbarg,n for Witten's class. The second, using the vanishing property, is the construction of relations in the tautological ring of Mbarg,n. Pixton has previously conjectured a system of tautological relations on Mbarg,n (which extends the established Faber-Zagier relations on Mg). Our 3-spin construction exactly yields Pixton's conjectured relations. As the classification of CohFTs is a topological result depending upon the Madsen-Weiss theorem (Mumford's conjecture), our construction proves relations in cohomology. The study of Witten's class and the associated tautological relations for r-spin curves via a parallel strategy will be taken up in a following paper.