Existence of Bkα,β-Structures on Ck-Manifolds

Abstract

In this paper we introduce Bα,βk-manifolds as generalizations of the notion of smooth manifolds with G-structure or with k-bounded geometry. These are Ck-manifolds whose transition functions ji=ji-1 are such that ∂μji∈ Bα(r) Ck-β(r) for every μ=r, where B=(Br)r∈ is some sequence of presheaves of Fr\'echet spaces endowed with further structures, ⊂Z≥0 is some parameter set and α,β are functions. We present embedding theorems for the presheaf category of those structural presheaves B. The existence problem of Bα,βk-structures on Ck-manifolds is studied and it is proved that under certain conditions on B, α and β, the forgetful functor from Ck-manifolds to Bα,βk-manifolds has adjoints.