Michael A. Mandell
Mathematics · Indiana University
Publications
48
Citations
1,710
Est. group size
—
Recurring co-author estimate
Active years
57
Publishing since 1970
Michael A. Mandell works in algebraic topology, a branch of pure mathematics that studies the shape and structure of spaces using algebraic tools. His research focuses on advanced invariants such as algebraic K-theory, topological cyclic homology, and homotopy theory, including detailed study of the 'sphere spectrum,' a foundational object in the field. Some recent work also touches on applying geometric and topological ideas to data analysis.
Publication activity has been steady over the last decade, averaging roughly one to two papers per year with no clear upward or downward trend.
Generated by claude-opus-4-8 from public bibliographic data · Jul 11, 2026
- Chromatic convergence for the algebraic K‐theory of the sphere spectrum
Journal of the London Mathematical Society · 2026
- The Strong Künneth Theorem for Topological Periodic Cyclic Homology
Memoirs of the American Mathematical Society · 2024
- Resampling and averaging coordinates on data
arXiv (Cornell University) · 2024
- Relative cyclotomic structures and equivariant complex cobordism
arXiv (Cornell University) · 2023
- Operads and operadic algebras in homotopy theory
2022
- The eigensplitting of the fiber of the cyclotomic trace for the sphere spectrum
Transactions of the American Mathematical Society · 2022
- Norms for compact Lie groups in equivariant stable homotopy theory
arXiv (Cornell University) · 2022
- A version of Waldhausen's chromatic convergence for TC$TC$
Bulletin of the London Mathematical Society · 2022
- A version of Waldhausen's chromatic convergence for $TC$
arXiv (Cornell University) · 2021
- Localization for 𝑇𝐻𝐻(𝑘𝑢) and the Topological Hochschild and Cyclic Homology of Waldhausen Categories
Memoirs of the American Mathematical Society · 2020
- K-theoretic Tate–Poitou duality and the fiber of the cyclotomic trace
Inventiones mathematicae · 2020
- The eigensplitting of the fiber of the cyclotomic trace for the sphere spectrum
arXiv (Cornell University) · 2020
- The homotopy groups of the algebraic K–theory of the sphere spectrum
Geometry & Topology · 2019
- Operads and Operadic Algebras in Homotopy Theory
arXiv (Cornell University) · 2019
- Topological Cyclic Homology Via the Norm
Documenta Mathematica · 2018
- arXiv (Cornell University)×7
- Geometry & Topology×2
- Memoirs of the American Mathematical Society×2
- Documenta Mathematica×1
- Journal of the London Mathematical Society×1
This profile was generated automatically from public scholarly data (OpenAlex). Group size and activity levels are estimates derived from co-authorship patterns.
Last updated Jul 11, 2026.
Claim or correct this profile