A Deligne conjecture for prestacks

Abstract

We prove an analog of the Deligne conjecture for prestacks. We show that given a prestack A, its Gerstenhaber--Schack complex CGS( A) is naturally an E2-algebra. This structure generalises both the known L∞-algebra structure on CGS( A), as well as the Gerstenhaber algebra structure on its cohomology HGS( A). The main ingredient is the proof of a conjecture of Hawkins hawkins, stating that the dg operad Quilt has vanishing homology in positive degrees. As a corollary, Quilt is quasi-isomorphic to the operad Brace encoding brace algebras. In addition, we improve the L∞-structure on Quilt by showing that it originates from a PreLie∞-structure lifting the PreLie-structure on Brace in homology.