The chain rule in Goodwillie calculus
Publication date
2025-08-27
Authors
Blans, Max Alban
Editors
Advisors
Supervisors
Moerdijk, Ieke
Heuts, Gijs
Document Type
Dissertation
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Abstract
Goodwillie calculus assigns to every reduced finitary functor between differentiable categories a sequence of derivatives. For functors on the category of pointed spaces or spectra, Arone and Ching showed that these derivatives satisfy a chain rule. Lurie conjectured that such a chain rule holds in much greater generality. The main purpose of this thesis is to give a proof – found in collaboration with Thomas Blom – of this conjecture. The key step in the argument is the construction of a lax monoidal structure on the Goodwillie derivatives functor.
Keywords
homotopietheorie, calculus van Goodwillie, hogere categorietheorie, koszuldualiteit, operaden, homotopy theory, Goodwillie calculus, higher category theory, Koszul duality, operads
Citation
Blans, M A 2025, 'The chain rule in Goodwillie calculus', Doctor of Philosophy, Universiteit Utrecht, Utrecht. https://doi.org/10.33540/3140