Box operads and higher Gerstenhaber brackets

Abstract

We introduce a symmetric operad p ("box-op") which describes a certain calculus of rectangular labeled ``boxes''. Algebras over p, which we call box operads, have appeared under the name of fc multicategories in work by Leinster LeinsterFcmulticategories1999. In our main result, we endow a suitable (graded, zero differential) totalisation ptd with a morphism L∞ → ptd. We show that p acts on an N3-graded enlargement of the N2-graded Gerstenhaber-Schack object CGS(A) of a quiver A on a small category from DinhVanLowen2018. This action restricts to an L∞-structure on CGS(A) (with zero differential). For an element α = (m,f,c) ∈ CGS2(A), the Maurer-Cartan equation holds precisely when (A, m, f, c) is a lax prestack with multiplications m, restrictions f, and twists c. As a consequence, the α-twisted L∞-structure on CGS(A) controls the deformation theory of (A, α) as a lax prestack.