English

Monoidal Structures in Orthogonal Calculus

Algebraic Topology 2024-02-28 v2

Abstract

Orthogonal Calculus, first developed by Weiss in 1991, provides a calculus of functors for functors from real inner product spaces to spaces. Many of the functors to which Orthogonal Calculus has been applied since carry an additional lax symmetric monoidal structure which has so far been ignored. For instance, the functor VBO(V)V \mapsto \text{BO}(V) admits maps BO(V)×BO(W)BO(VW)\text{BO}(V) \times \text{BO}(W) \to \text{BO}(V \oplus W) which determine a lax symmetric monoidal structure. Our first main result, Corollary 4..2..0..2, states that the Taylor approximations of a lax symmetric monoidal functor are themselves lax symmetric monoidal. We also study the derivative spectra of lax symmetric monoidal functors, and prove in Corollary 5..4..0..1 that they admit O(n)O(n)-equivariant structure maps of the form ΘnFΘnFDO(n)ΘnF\Theta^nF \otimes \Theta^nF \to D_{O(n)} \otimes \Theta^nF where DO(n)SAdnD_{O(n)} \simeq S^{\text{Ad}_n} is the Klein-Spivak dualising spectrum of the topological group O(n)O(n). As our proof methods are largely abstract and \infty-categorical, we also formulate Orthogonal Calculus in that language before proving our results.

Cite

@article{arxiv.2309.15058,
  title  = {Monoidal Structures in Orthogonal Calculus},
  author = {Leon Hendrian},
  journal= {arXiv preprint arXiv:2309.15058},
  year   = {2024}
}

Comments

81 pages, essentially identical to the authors PhD thesis v2: corrected a comment about the topological/cotopological factorisation of the localisation maps

R2 v1 2026-06-28T12:32:55.869Z