Homogeneity actions, N-manifolds, and the Frobenius theorem

Abstract

This paper is devoted to N-graded supermanifolds M whose grading is induced by a homogeneity action, i.e., a smooth action R t ht of the multiplicative monoid of real numbers on M. We show that the map h0 is a smooth retraction onto a submanifold M=h0(M), and that h0:M M is a fiber bundle with typical fiber Rm|n. Using this homogeneity approach, we obtain a simple proof of a homogeneous version of the Frobenius theorem. If, in addition, h-1 acts as the parity operator on M, we provide a geometric characterization equivalent to the recent definition of N-manifolds due to Bursztyn, Cueca, and Mehta in terms of sheaves of graded algebras with prescribed local models. As a consequence, the homogeneous Frobenius theorem for N-manifolds proved by these authors appears as a special case of our more general result.