What question did this study set out to answer?

To explore the factors obstructing homotopy invariance in the context of loop coproducts using parameterized fixed-point theory.

March 10, 2026Open Access

Obstructions to homotopy invariance of loop coproduct via parameterized fixed‐point theory

Key Points

To explore the factors obstructing homotopy invariance in the context of loop coproducts using parameterized fixed-point theory.
Defined Reidemeister trace based on homotopy equivalence of compact manifolds with boundary.
Utilized Geoghegan and Nicas's construction for spectral maps.
Analyzed the relationship between Goresky-Hingston coproduct and Chas-Sullivan multiplication.
Identified failure of entwining spectral coproducts characterized by Chas-Sullivan multiplication.
Demonstrated agreement of spectral coproducts when involved in simple homotopy equivalences.

Abstract

Abstract Given a homotopy equivalence of compact manifolds with boundary, we use a construction of Geoghegan and Nicas to define its Reidemeister trace . We realize the Goresky–Hingston coproduct as a map of spectra, and show that the failure of to entwine the spectral coproducts can be characterized by Chas–Sullivan multiplication with . In particular, when is a simple homotopy equivalence, the spectral coproducts of and agree.

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Cite This Study

Kenigsberg et al. (Wed,) studied this question.

synapsesocial.com/papers/69af95de70916d39fea4ddca https://doi.org/https://doi.org/10.1112/topo.70066

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