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March 2004 Strong marked isospectrality of affine Lorentzian groups
Virginie Charette, Todd Drumm
J. Differential Geom. 66(3): 437-452 (March 2004). DOI: 10.4310/jdg/1098137839

Abstract

The Margulis invariant α is a function on H 1(Γ,ℝ2,1), where Γ is a group of Lorentzian transformations acting on ℝ2,1, that contains no elliptic elements. The spectrum of Γ is the image of all γ∈Γ∖ (Id) under the map α. If the underlying linear group of Γ is fixed, Drumm and Goldman proved that the spectrum defines the translational part completely. In this note, we strengthen this result by showing that isospectrality holds for any free product of cyclic groups of given rank, up to conjugation in the group of affine transformations of ℝ2,1, as long as it is non-radiant, and that its linear part is discrete and non-elementary. In particular, isospectrality holds when the linear part is a Schottky group.

Citation

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Virginie Charette. Todd Drumm. "Strong marked isospectrality of affine Lorentzian groups." J. Differential Geom. 66 (3) 437 - 452, March 2004. https://doi.org/10.4310/jdg/1098137839

Information

Published: March 2004
First available in Project Euclid: 18 October 2004

zbMATH: 1083.53045
MathSciNet: MR2106472
Digital Object Identifier: 10.4310/jdg/1098137839

Rights: Copyright © 2004 Lehigh University

Vol.66 • No. 3 • March 2004
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