Higher Koszul brackets on the cotangent complex

Abstract

Let n 1 and A be a commutative algebra of the form k[x1,x2,…, xn]/I where k is a field of characteristic 0 and I⊂eq k[x1,x2,…, xn] is an ideal. Assume that there is a Poisson bracket \\:,\:\ on S such that \I,S\⊂eq I and let us denote the induced bracket on A by \\:,\:\ as well. It is well-known that [ d xi, d xj]:= d\xi,xj\ defines a Lie bracket on the A-module A| k of K\"ahler differentials making (A,A| k) a Lie-Rinehart pair. Recall that A is regular if and only if A| k is projective as an A-module. If A is not regular, the cotangent complex LA| k may serve as a replacement for the A-module A| k. We prove that there is a structure of an L∞-algebroid on LA| k, compatible with the Lie-Rinehart pair (A,A| k). The L∞-algebroid on LA| k actually comes from a P∞-algebra structure on the resolvent of the morphism k[x1,x2,…, xn] A. We identify examples when this L∞-algebroid simplifies to a dg Lie algebroid. For aesthetic reasons we concentrate on cases when k[x1,x2,…, xn] carries a (possibly nonstandard) Z 0-grading and both I and \\:,\:\ are homogeneous.