English

A chain coalgebra model for the James map

Algebraic Topology 2007-05-23 v1

Abstract

Let EK be the simplicial suspension of a pointed simplicial set K. We construct a chain model of the James map, αK:CKΩCEK\alpha_{K} : CK \to \Omega CEK. We compute the cobar diagonal on ΩCEK\Omega CEK, not assuming that EKEK is 1-reduced, and show that αK\alpha_{K} is comultiplicative. As a result, the natural isomorphism of chain algebras TCKΩCKTCK \cong \Omega CK preserves diagonals. In an appendix, we show that the Milgram map, Ω(AB)ΩAΩB\Omega (A \otimes B) \to \Omega A \otimes \Omega B, where A and B are coaugmented coalgebras, forms part of a strong deformation retract of chain complexes. Therefore, it is a chain equivalence even when A and B are not 1-connected.

Keywords

Cite

@article{arxiv.math/0609444,
  title  = {A chain coalgebra model for the James map},
  author = {Kathryn Hess and Paul-Eugene Parent and Jonathan Scott},
  journal= {arXiv preprint arXiv:math/0609444},
  year   = {2007}
}

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20 pages