We give a simple proof of Curtis' theorem: if A• is a k-connected free simplicial abelian group, then Ln(A•) is a k + ⌈ log2 n⌉-connected simplicial abelian group, where Ln is the n-th Lie power functor. In the proof we do not use Curtis' decomposition of Lie powers. Instead we use the Chevalley Eilenberg complex for the free Lie algebra.

Original languageEnglish
Pages (from-to)251-258
Number of pages8
JournalHomology, Homotopy and Applications
Volume22
Issue number2
DOIs
StatePublished - 6 May 2020

    Research areas

  • Chevalley eilenberg complex, Con-nectivity, Homotopy theory, Simplicial group, Unstable adams spectral sequence

    Scopus subject areas

  • Mathematics (miscellaneous)

ID: 62108094