Book contents
- Frontmatter
- Table of Contents
- List of Contributors
- Preface
- Frontispiece
- 1 Comparing Dualities in the K(n)-local Category
- 2 Axiomatic Representation Theory of Finite Groups by way of Groupoids
- 3 Chromatic Fracture Cubes
- 4 An Introduction to Algebraic Models for Rational G–Spectra
- 5 Monoidal Bousfield Localizations and Algebras over Operads
- 6 Stratification and Duality for Unipotent Finite Supergroup Schemes
- 7 Bi-incomplete Tambara Functors
- 8 Homotopy Limits of Model Categories, Revisited
1 - Comparing Dualities in the K(n)-local Category
Published online by Cambridge University Press: 29 October 2021
Book contents
- Frontmatter
- Table of Contents
- List of Contributors
- Preface
- Frontispiece
- 1 Comparing Dualities in the K(n)-local Category
- 2 Axiomatic Representation Theory of Finite Groups by way of Groupoids
- 3 Chromatic Fracture Cubes
- 4 An Introduction to Algebraic Models for Rational G–Spectra
- 5 Monoidal Bousfield Localizations and Algebras over Operads
- 6 Stratification and Duality for Unipotent Finite Supergroup Schemes
- 7 Bi-incomplete Tambara Functors
- 8 Homotopy Limits of Model Categories, Revisited
Summary
In their work on the period map and the dualising sheaf for Lubin–Tate space, Gross and the second author wrote down an equivalence between the Spanier–Whitehead and Brown–Comenetz duals of certain type n-complexes in the K(n)-local category at large primes. In the culture of the time, these results were accessible to educated readers, but this seems no longer to be the case; therefore, in this note we give the details. Because we are at large primes, the key result is algebraic: in the Picard group of Lubin–Tate space, two important invertible sheaves become isomorphic modulo p.
- Type
- Chapter
- Information
- Equivariant Topology and Derived Algebra , pp. 1 - 38Publisher: Cambridge University PressPrint publication year: 2021