On the reduced space of multiplicative multivectors

Abstract

A strict Lie 2-algebra ( A) T→ Xmult(G) is associated with any Lie groupoid G. Here, ( A) is the Schouten algebra of the tangent Lie algebroid A of G and Xmult(G) is the space of multiplicative multivectors on G. The quotient Rmult:=Xmult(G)/Img T, a Morita invariant of G, is called the reduced space of multiplicative multivectors. We prove a canonical decomposition formula of elements in Xmult(G) and establish a key relation between Rmultk and the cohomology H 1(J G,k A) where J G is the jet groupoid of G and 1≤slant k≤slant rank A. We also study Rdiff , the reduced space of Lie algebroid differentials on A. By taking infinitesimals, δ: Rmult Rdiff , the two reduced spaces are related. We find that the kernel of δ is isomorphic to the kernel of the Van Est map H1(G,k ) H1(A,k ), where is the anchor of A.