The Galois groupoid of G-spectra is equivalent to the étale fundamental groupoid of the Burnside ring of G.
Nilpotence and descent in equivariant stable homotopy theory , Url =
4 Pith papers cite this work. Polarity classification is still indexing.
4
Pith papers citing it
verdicts
UNVERDICTED 4representative citing papers
The condensed fundamental group of Spec(Z) is non-trivial, hence Spec(Z) is not condensed contractible.
Introduces chromatic defect via X(n), computes it for key spectra, develops an obstruction theory, and shows Wood-like equivalences exist generally to construct Z-indexed Adams-Novikov towers.
Shape theory for condensed anima recovers classical shape for paracompact compactly generated and locally contractible spaces while extending sheaf-condensed cohomology comparisons.
citing papers explorer
-
The Galois theory of $G$-spectra and the Burnside ring
The Galois groupoid of G-spectra is equivalent to the étale fundamental groupoid of the Burnside ring of G.
-
On Galois categories and condensed contractible schemes
The condensed fundamental group of Spec(Z) is non-trivial, hence Spec(Z) is not condensed contractible.
-
Chromatic defect, Wood's theorem, and higher real $K$-theories
Introduces chromatic defect via X(n), computes it for key spectra, develops an obstruction theory, and shows Wood-like equivalences exist generally to construct Z-indexed Adams-Novikov towers.
-
Shape theory for condensed anima
Shape theory for condensed anima recovers classical shape for paracompact compactly generated and locally contractible spaces while extending sheaf-condensed cohomology comparisons.