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On projective Anosov subgroups of symplectic groups: research article

We prove that a word hyperbolic group whose Gromovboundary properly contains a 2-sphere cannot admita projective Anosov representation into 𝖲𝗉2𝑚(ℂ),𝑚∈ℕ. We also prove that a word hyperbolic group thatadmits a projective Anosov representation into 𝖲𝗉2𝑚(ℝ) is virtually a free group or virtually a surf...

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Bibliographic Details
Main Authors: Pozzetti, Maria Beatrice (Author) , Tsouvalas, Konstantinos (Author)
Format: Article (Journal)
Language:English
Published: 04 November 2023
Edition:Online version of record before inclusion in an issue
In: Bulletin of the London Mathematical Society
Year: 2023, Pages: 1-8
ISSN:1469-2120
DOI:10.1112/blms.12951
Online Access:Verlag, kostenfrei, Volltext: https://doi.org/10.1112/blms.12951
Verlag, kostenfrei, Volltext: https://onlinelibrary.wiley.com/doi/abs/10.1112/blms.12951
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Author Notes:Maria Beatrice Pozzetti, Konstantinos Tsouvalas
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Summary:We prove that a word hyperbolic group whose Gromovboundary properly contains a 2-sphere cannot admita projective Anosov representation into 𝖲𝗉2𝑚(ℂ),𝑚∈ℕ. We also prove that a word hyperbolic group thatadmits a projective Anosov representation into 𝖲𝗉2𝑚(ℝ) is virtually a free group or virtually a surface group,a result established independently by Dey–Greenberg–Riestenberg.
Item Description:Gesehen am 19.01.2024
Physical Description:Online Resource
ISSN:1469-2120
DOI:10.1112/blms.12951

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