Smooth singular complexes and diffeological principal bundles

Abstract

In previous papers, we used the standard simplices p (p 0) endowed with diffeologies having several good properties to introduce the singular complex S(X) of a diffeological space X. On the other hand, Hector and Christensen-Wu used the standard simplices p sub (p 0) endowed with the sub-diffeology of p+1 and the standard affine p-spaces p (p 0) to introduce the singular complexes S sub(X) and S aff(X), respectively, of a diffeological space X. In this paper, we prove that S(X) is a fibrant approximation both of S sub(X) and S aff(X). This result easily implies that the homotopy groups of S sub(X) and S aff(X) are isomorphic to the smooth homotopy groups of X, proving a conjecture of Christensen and Wu. Further, we characterize diffeological principal bundles (i.e., principal bundles in the sense of Iglesias-Zemmour) using the singular functor S aff. By using these results, we extend characteristic classes for -numerable principal bundles to characteristic classes for diffeological principal bundles.