Poincar\'e duality of wonderful compactifications and tautological rings

Abstract

Let g ≥ 2. Let Mg,nrt be the moduli space of n-pointed genus g curves with rational tails. Let Cgn be the n-fold fibered power of the universal curve over Mg. We prove that the tautological ring of Mg,nrt has Poincar\'e duality if and only if the same holds for the tautological ring of Cgn. We also obtain a presentation of the tautological ring of Mg,nrt as an algebra over the tautological ring of Cgn. This proves a conjecture of Tavakol. Our results are valid in the more general setting of wonderful compactifications.