Category of manifolds mathematics , the category of manifoldsdenoted Man p smoothness class C p p -times continuously differentiable maps. This is a category because the composition of two C p C p C p A , and the category of such manifolds is denoted Man p C p fixed space E is denoted Man p smooth manifolds , Man ∞ , or the category of analytic manifolds, Man ω Man p sets with additional structure and its morphisms are functions preserving this structure. There is a natural forgetful functor category of topological spaces which assigns to each manifold the underlying topological space and to each p -times continuously differentiable function the underlying continuous function of topological spaces . Similarly, there is a natural forgetful functor category of sets which assigns to each manifold the underlying set and to each p -times continuously differentiable function the underlying function .Pointed manifolds and the tangent space functor It is often convenient or necessary to work with the category of manifolds along with a distinguished point: Man• p analogous to Top• - the category of pointed spaces . The objects of Man• p are pairs where is a manifold along with a basepoint and its morphisms are basepoint-preserving p -times continuously differentiable maps: e.g. such that The category of pointed manifolds is an example of a comma category - Man• p is exactly where represents an arbitrary singleton set , and the represents a map from that singleton to an element of Manp , picking out a basepoint.Man• p to VectR as follows: given pointed manifolds and with a map between them, we can assign the vector spaces and with a linear map between them given by the pushforward : This construction is a genuine functor because the pushforward of the identity map is the vector space isomorphism and the chain rule ensures that
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