Brown's dihedral moduli space and freedom of the gravity operad

Abstract

Francis Brown introduced a partial compactification M0,nδ of the moduli space M0,n. We prove that the gravity cooperad, given by the degree-shifted cohomologies of the spaces M0,n, is cofree as a nonsymmetric anticyclic cooperad; moreover, the cogenerators are given by the cohomology groups of M0,nδ. This says in particular that H(M0,nδ) injects into H(M0,n). As part of the proof we construct an explicit diagrammatically defined basis of H(M0,n) which is compatible with cooperadic cocomposition, and such that a subset forms a basis of H(M0,nδ). We show that our results are equivalent to the claim that Hk(M0,nδ) has a pure Hodge structure of weight 2k for all k, and we conclude our paper by giving an independent and completely different proof of this fact. The latter proof uses a new and explicit iterative construction of M0,nδ from An-3 by blow-ups and removing divisors, analogous to Kapranov's and Keel's constructions of M0,n from Pn-3 and (P1)n-3, respectively.