5. Parameterized stability and the universal property of global spectra
Joint with Tobias Lenz and Sil Linskens.
Published in Journal of Topology (2025)
DOI: 10.1112/topo.70044
ArXiv: arxiv:2301.08240.
4. Universality of Barwick's unfurling construction
Joint with Tobias Lenz and Maxime Ramzi.
Published in International Mathematics Research Notices (2025)
DOI: 10.1093/imrn/rnaf280
ArXiv: arXiv:2502.18278.
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: 10.1017/fms.2025.23
ArXiv: arXiv:2210.17364.
2. The Adams isomorphism revisited
Joint with Tobias Lenz and Sil Linskens.
Published in Mathematische Zeitschrift 308.2 (2024)
DOI: 10.1007/s00209-024-03582-w
ArXiv: arXiv:2311.04884.
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: 10.1090/tran/9497
ArXiv: arXiv:2307.11001.
7. 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.
6. A short proof of the universality of the relative Rezk nerve
Joint with Kensuke Arakawa.
Preprint, May 2025, arXiv:2505.14123.
5. Normed equivariant ring spectra and higher Tambara functors
Joint with Rune Haugseng, Tobias Lenz and Sil Linskens.
Preprint, July 2024, arXiv:2407.08399.
4. Global spaces and the homotopy theory of stacks
Joint with Adrian Clough and Sil Linskens.
Preprint, July 2024, arXiv:2407.06877.
3. Parametrized higher semiadditivity and the universality of spans
Joint with Tobias Lenz and Sil Linskens.
Preprint, March 2024, arXiv:2403.07676.
2. Homotopical commutative rings and bispans
Joint with Rune Haugseng, Tobias Lenz and Sil Linskens.
Preprint, March 2024, arXiv:2403.06911.
1. Twisted ambidexterity in equivariant homotopy theory
Preprint, March 2023, arxiv:2303.00736.
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.