The Balmer spectrum of the equivariant homotopy category of a finite abelian group

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Standard

The Balmer spectrum of the equivariant homotopy category of a finite abelian group. / Hausmann, Markus; Barthel, Tobias; Naumann, Niko; Nikolaus, Thomas; Noel, Justin; Stapleton, Nathaniel.

In: Inventiones Mathematicae, Vol. 216, 2019, p. 215–240.

Research output: Contribution to journalJournal articlepeer-review

Harvard

Hausmann, M, Barthel, T, Naumann, N, Nikolaus, T, Noel, J & Stapleton, N 2019, 'The Balmer spectrum of the equivariant homotopy category of a finite abelian group', Inventiones Mathematicae, vol. 216, pp. 215–240. https://doi.org/10.1007/s00222-018-0846-5

APA

Hausmann, M., Barthel, T., Naumann, N., Nikolaus, T., Noel, J., & Stapleton, N. (2019). The Balmer spectrum of the equivariant homotopy category of a finite abelian group. Inventiones Mathematicae, 216, 215–240. https://doi.org/10.1007/s00222-018-0846-5

Vancouver

Hausmann M, Barthel T, Naumann N, Nikolaus T, Noel J, Stapleton N. The Balmer spectrum of the equivariant homotopy category of a finite abelian group. Inventiones Mathematicae. 2019;216:215–240. https://doi.org/10.1007/s00222-018-0846-5

Author

Hausmann, Markus ; Barthel, Tobias ; Naumann, Niko ; Nikolaus, Thomas ; Noel, Justin ; Stapleton, Nathaniel. / The Balmer spectrum of the equivariant homotopy category of a finite abelian group. In: Inventiones Mathematicae. 2019 ; Vol. 216. pp. 215–240.

Bibtex

@article{158d7a2782934a6a96c6732507aadce2,
title = "The Balmer spectrum of the equivariant homotopy category of a finite abelian group",
abstract = "For a finite abelian group A, we determine the Balmer spectrum of the compact objects in genuine A-spectra. This generalizes the case A=Z/pZ due to Balmer and Sanders (Invent Math 208(1):283–326, 2017), by establishing (a corrected version of) their log_p -conjecture for abelian groups. We also work out the consequences for the chromatic type of fixed-points and establish a generalization of Kuhn{\textquoteright}s blue-shift theorem for Tate-constructions (Kuhn in Invent Math 157(2):345–370, 2004)",
author = "Markus Hausmann and Tobias Barthel and Niko Naumann and Thomas Nikolaus and Justin Noel and Nathaniel Stapleton",
year = "2019",
doi = "10.1007/s00222-018-0846-5",
language = "English",
volume = "216",
pages = "215–240",
journal = "Inventiones Mathematicae",
issn = "0020-9910",
publisher = "Springer",

}

RIS

TY - JOUR

T1 - The Balmer spectrum of the equivariant homotopy category of a finite abelian group

AU - Hausmann, Markus

AU - Barthel, Tobias

AU - Naumann, Niko

AU - Nikolaus, Thomas

AU - Noel, Justin

AU - Stapleton, Nathaniel

PY - 2019

Y1 - 2019

N2 - For a finite abelian group A, we determine the Balmer spectrum of the compact objects in genuine A-spectra. This generalizes the case A=Z/pZ due to Balmer and Sanders (Invent Math 208(1):283–326, 2017), by establishing (a corrected version of) their log_p -conjecture for abelian groups. We also work out the consequences for the chromatic type of fixed-points and establish a generalization of Kuhn’s blue-shift theorem for Tate-constructions (Kuhn in Invent Math 157(2):345–370, 2004)

AB - For a finite abelian group A, we determine the Balmer spectrum of the compact objects in genuine A-spectra. This generalizes the case A=Z/pZ due to Balmer and Sanders (Invent Math 208(1):283–326, 2017), by establishing (a corrected version of) their log_p -conjecture for abelian groups. We also work out the consequences for the chromatic type of fixed-points and establish a generalization of Kuhn’s blue-shift theorem for Tate-constructions (Kuhn in Invent Math 157(2):345–370, 2004)

U2 - 10.1007/s00222-018-0846-5

DO - 10.1007/s00222-018-0846-5

M3 - Journal article

VL - 216

SP - 215

EP - 240

JO - Inventiones Mathematicae

JF - Inventiones Mathematicae

SN - 0020-9910

ER -

ID: 211219206