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Quasiflats with holes in
reductive groups
Kevin Wortman |
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Algebraic & Geometric Topology 6 (2006) 91–117
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arXiv: math.GT/0401360 |
Abstract |
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We give a new proof of a theorem of Kleiner–Leeb: that any quasi-isometrically embedded Euclidean space in a product of symmetric spaces and Euclidean buildings is contained in a metric neighborhood of finitely many flats, as long as the rank of the Euclidean space is not less than the rank of the target. A bound on the size of the neighborhood and on the number of flats is determined by the size of the quasi-isometry constants. Without using asymptotic cones, our proof focuses on the intrinsic geometry of symmetric spaces and Euclidean buildings by extending the proof of Eskin–Farb’s quasiflat with holes theorem for symmetric spaces with no Euclidean factors. |
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Keywords
Euclidean building, symmetric space, geometric realization
of algebraic 2 complexes, quasi-isometry
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Mathematical Subject Classification 2000
Primary: 20F65
Secondary: 20G30, 22E40
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References |
Forward citations |
Publication
Received: 18 November 2004
Accepted: 11 August 2005
Published: 24 February 2006
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Authors |
| Kevin Wortman | |
| Department of Mathematics Yale University 10 Hillhouse Ave PO Box 208283 New Haven CT 06520-8283 USA |
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