Twisted complexes and simplicial homotopies

Abstract

In this paper we consider the dg-category of twisted complexes over simplicial ringed spaces. It is clear that a simplicial map f: (U,R) (V, S) between simplicial ringed spaces induces a dg-functor f*: Tw(V, S) Tw(U, R) where Tw(U, R) denotes the dg-category of twisted complexes on (U,R). In this paper we prove that for simplicial homotopic maps f and g, there exists an A∞-natural transformation : f*⇒ g* between induced dg-functors. Moreover the 0th component of is an objectwise weak equivalence. If we restrict ourselves to the full dg-subcategory of twisted perfect complexes, then we prove that admits an A∞-quasi-inverse when (U,R) satisfies some additional conditions.