Internal symmetry of the L≤slant 3 algebra arising from a Lie pair

Abstract

A Lie pair is an inclusion A to L of Lie algebroids over the same base manifold. In an earlier work, the third author with Bandiera, Sti\'enon, and Xu introduced a canonical L≤slant 3 algebra ( A L/A) whose unary bracket is the Chevalley-Eilenberg differential arising from every Lie pair (L,A). In this note, we prove that to such a Lie pair there is an associated Lie algebra action by Der(L) on the L≤slant 3 algebra ( A L/A). Here Der(L) is the space of derivations on the Lie algebroid L, or infinitesimal automorphisms of L. The said action gives rise to a larger scope of gauge equivalences of Maurer-Cartan elements in ( A L/A), and for this reason we elect to call the Der(L)-action internal symmetry of ( A L/A).