8. Twisted ambidexterity in equivariant homotopy theory
Published in Journal of Topology (2026) (DOI, ArXiv)
7. A short proof of the universality of the relative Rezk nerve
Joint with Kensuke Arakawa.
Published in Proceedings of the American Mathematical Society (2026) (DOI, ArXiv)
6. Parameterized stability and the universal property of global spectra
Joint with Tobias Lenz and Sil Linskens.
Published in Journal of Topology (2025) (DOI, ArXiv)
5. Homotopical commutative rings and bispans
Joint with Rune Haugseng, Tobias Lenz and Sil Linskens.
Published in the Journal of the London Mathematical Society (2025) (DOI, ArXiv)
4. Universality of Barwick's unfurling construction
Joint with Tobias Lenz and Maxime Ramzi.
Published in International Mathematics Research Notices (2025) (DOI, ArXiv)
3. Characters and transfer maps via categorified traces
Joint with Shachar Carmeli, Maxime Ramzi and Lior Yanovski.
Published in Forum of Mathematics, Sigma (2025) (DOI, ArXiv)
2. The Adams isomorphism revisited
Joint with Tobias Lenz and Sil Linskens.
Published in Mathematische Zeitschrift 308.2 (2024) (DOI, ArXiv)
1. Partial parametrized presentability and the universal property of equivariant spectra
Joint with Tobias Lenz and Sil Linskens.
Published in Transactions of the American Mathematical Society (2024) (DOI, ArXiv)
4. Universality of span 2-categories and the construction of 6-functor formalisms
Joint with Tobias Lenz and Sil Linskens.
Preprint, May 2025, arXiv:2505.19192.
3. Normed equivariant ring spectra and higher Tambara functors
Joint with Rune Haugseng, Tobias Lenz and Sil Linskens.
Preprint, July 2024, arXiv:2407.08399.
2. Global spaces and the homotopy theory of stacks
Joint with Adrian Clough and Sil Linskens.
Preprint, July 2024, arXiv:2407.06877.
1. Parametrized higher semiadditivity and the universality of spans
Joint with Tobias Lenz and Sil Linskens.
Preprint, March 2024, arXiv:2403.07676.
Stable Homotopy Theory and Higher Algebra: An in-progress book project that aims to provide an accessible account of stable homotopy theory and higher algebra via a model-independent approach to ∞-category theory.
Synthetic Category Theory: An in-progress book project in which we provide an axiomatic treatment of the theory of ∞-categories. Joint with Denis-Charles Cisinski, Kim Nguyen and Tashi Walde.