Javascript must be enabled to continue!

Grothendieck–Neeman duality and the Wirthmüller isomorphism

We clarify the relationship between Grothendieck duality à la Neeman and the Wirthmüller isomorphism à la Fausk–Hu–May. We exhibit an interesting pattern of symmetry in the existence of adjoint functors between compactly generated tensor-triangulated categories, which leads to a surprising trichotomy: there exist either exactly three adjoints, exactly five, or infinitely many. We highlight the importance of so-called relative dualizing objects and explain how they give rise to dualities on canonical subcategories. This yields a duality theory rich enough to capture the main features of Grothendieck duality in algebraic geometry, of generalized Pontryagin–Matlis duality à la Dwyer–Greenless–Iyengar in the theory of ring spectra, and of Brown–Comenetz duality à la Neeman in stable homotopy theory.

Cambridge University Press (CUP)

Paul Balmer Ivo Dell’Ambrogio Beren Sanders

Compositio Mathematica

2016

Title: Grothendieck–Neeman duality and the Wirthmüller isomorphism

Description:

We clarify the relationship between Grothendieck duality à la Neeman and the Wirthmüller isomorphism à la Fausk–Hu–May.

We exhibit an interesting pattern of symmetry in the existence of adjoint functors between compactly generated tensor-triangulated categories, which leads to a surprising trichotomy: there exist either exactly three adjoints, exactly five, or infinitely many.

We highlight the importance of so-called relative dualizing objects and explain how they give rise to dualities on canonical subcategories.

This yields a duality theory rich enough to capture the main features of Grothendieck duality in algebraic geometry, of generalized Pontryagin–Matlis duality à la Dwyer–Greenless–Iyengar in the theory of ring spectra, and of Brown–Comenetz duality à la Neeman in stable homotopy theory.

Back

L'anneau de Grothendieck d'une structure a été défini par Tom Scanlon et Jan Krajicek d'une part, et François Loeser et Jan Dnf d'autre part. Il est obtenuà partir des ensembles dé...

THE GROTHENDIECK CONSTANT IS STRICTLY SMALLER THAN KRIVINE’S BOUND

AbstractThe (real) Grothendieck constant${K}_{G} $is the infimum over those$K\in (0, \infty )$such that for every$m, n\in \mathbb{N} $and every$m\times n$real matrix$({a}_{ij} )$we...

Isomorphism on Complex Fuzzy Graph

Objective: To investigate isomorphism between two complex fuzzy graphs and prove it is an equivalence relation. The major objective of this research paper is to elucidate weak and ...

Isomorphism

Abstract Isomorphism refers to the process whereby organizations become increasingly similar over time. There are two main approaches to understanding isomorphism: compet...

Minimax Duality for MIMO Interference Networks

A minimax duality for a Gaussian mutual information expression was introduced by Yu. An interesting observation is the relationship between cost constraints on the transmit covaria...

Distinguishing between topological isomorphism and topological equivalence of power electronic converters

In the process of deducing the topology of power electronic converters, scholars often use topological equivalence or topological isomorphism to identify topologies with different ...

The Tutte-Grothendieck Group of an Alphabetic Rewriting System

The two operations, deletion and contraction of an edge, on multigraphs directly lead to the Tutte polynomial which satisfies a universal problem. As observed by Brylawski (1972) i...

Conic Duality for Multi-Objective Robust Optimization Problem

Duality theory is important in finding solutions to optimization problems. For example, in linear programming problems, the primal and dual problem pairs are closely related, i.e.,...

Email:
Password:

Email:

Grothendieck–Neeman duality and the Wirthmüller isomorphism

Related Results