English

Smooth singular complexes and diffeological principal bundles

Algebraic Topology 2022-02-02 v1

Abstract

In previous papers, we used the standard simplices Δp\Delta^p (p0)(p\ge 0) endowed with diffeologies having several good properties to introduce the singular complex S\dcal(X)S^\dcal(X) of a diffeological space XX. On the other hand, Hector and Christensen-Wu used the standard simplices Δsubp\Delta^p_{\rm sub} (p0)(p\ge 0) endowed with the sub-diffeology of \rbbp+1\rbb^{p+1} and the standard affine pp-spaces \abbp\abb^p (p0)(p\ge 0) to introduce the singular complexes Ssub\dcal(X)S^\dcal_{\rm sub}(X) and Saff\dcal(X)S^\dcal_{\rm aff}(X), respectively, of a diffeological space XX. In this paper, we prove that S\dcal(X)S^\dcal(X) is a fibrant approximation both of Ssub\dcal(X)S^\dcal_{\rm sub}(X) and Saff\dcal(X)S^\dcal_{\rm aff}(X). This result easily implies that the homotopy groups of Ssub\dcal(X)S^\dcal_{\rm sub}(X) and Saff\dcal(X)S^\dcal_{\rm aff}(X) are isomorphic to the smooth homotopy groups of XX, 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 Saff\dcalS^\dcal_{\rm aff}. By using these results, we extend characteristic classes for \dcal\dcal-numerable principal bundles to characteristic classes for diffeological principal bundles.

Cite

@article{arxiv.2202.00131,
  title  = {Smooth singular complexes and diffeological principal bundles},
  author = {Hiroshi Kihara},
  journal= {arXiv preprint arXiv:2202.00131},
  year   = {2022}
}
R2 v1 2026-06-24T09:12:06.812Z