Strongly homotopy Lie algebras and deformations of calibrated submanifolds

Abstract

For an element in the graded vector space *(M, TM) of tangent bundle valued forms on a smooth manifold M, a -submanifold is defined as a submanifold N of M such that |N ∈ *(N, TN). The class of -submanifolds encompasses calibrated submanifolds, complex submanifolds and all Lie subgroups in compact Lie groups. The graded vector space *(M, TM) carries a natural graded Lie algebra structure, given by the Fr\"olicher-Nijenhuis bracket [-,- ]FN. When is an odd degree element with [ , ]FN =0, we associate to a -submanifold N a strongly homotopy Lie algebra, which governs the formal and (under certain assumptions) smooth deformations of N as a -submanifold, and we show that under certain assumptions these deformations form an analytic variety. As an application we revisit formal and smooth deformation theory of complex closed submanifolds and of -calibrated closed submanifolds, where is a parallel form in a real analytic Riemannian manifold.