English

$E_n$-Hopf invariants

Algebraic Topology 2020-12-16 v1

Abstract

The classical Hopf invariant is an invariant of homotopy classes of maps from S4n1S^{4n-1} to S2nS^{2n}, and is an important invariant in homotopy theory. The goal of this paper is to use the Koszul duality theory for EnE_n-operads to define a generalization of the classical Hopf invariant. One way of defining the classical Hopf invariant is by defining a pairing between the cohomology of the associative bar construction on the cochains of a space XX and the homotopy groups of XX. In this paper we will give a generalization of the classical Hopf invariant by defining a pairing between the cohomology of the EnE_n-bar construction on the cochains of XX and the homotopy groups of XX. This pairing gives us a set of invariants of homotopy classes of maps from SmS^m to a simplicial set XX, this pairing can detect more homotopy classes of maps than the classical Hopf invariant. The second part of the paper is devoted to combining the EnE_n-Hopf invariants with the Koszul duality theory for EnE_n-operads to get a relation between the EnE_n-Hopf invariants of a space XX and the En+1E_{n+1}-Hopf invariants of the suspension of XX. This is done by studying the suspension morphism for the EE_\infty-operad, which is a morphism from the EE_{\infty}-operad to the desuspension of the EE_\infty-operad. We show that it induces a functor from EE_\infty-algebras to EE_\infty-algebras, which has the property that it sends an EE_\infty-model for a simplicial set XX to an EE_\infty-model for the suspension of XX. We use this result to give a relation between the EnE_n-Hopf invariants of maps from SmS^m into XX and the En+1E_{n+1}-Hopf invariants of maps from Sm+1S^{m+1} into the suspension of XX. One of the main results we show here, is that this relation can be used to define invariants of stable homotopy classes of maps.

Keywords

Cite

@article{arxiv.1809.08112,
  title  = {$E_n$-Hopf invariants},
  author = {Felix Wierstra},
  journal= {arXiv preprint arXiv:1809.08112},
  year   = {2020}
}

Comments

26 pages

R2 v1 2026-06-23T04:14:02.556Z