Differential graded manifolds of finite positive amplitude

Abstract

We prove that dg manifolds of finite positive amplitude, i.e. bundles of positively graded curved L∞[1]-algebras, form a category of fibrant objects. As a main step in the proof, we obtain a factorization theorem using path spaces. First we construct an infinite-dimensional factorization of a diagonal morphism using actual path spaces motivated by the AKSZ construction. Then we cut down to finite dimensions using the Fiorenza-Manetti method. The main ingredient in our method is the homotopy transfer theorem for curved L∞[1]-algebras. As an application, we study the derived intersections of manifolds.