Dehn functions of higher rank arithmetic groups of type a_n in products of simple lie groups

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Title Dehn functions of higher rank arithmetic groups of type a_n in products of simple lie groups
Publication Type dissertation
School or College College of Science
Department Mathematics
Author Cesa, Morgan Lindsey baker
Date 2016
Description Suppose G is an arithmetic group defined over a global field K, that the K-type of G is An with n at least 2, and that the ambient semisimple group that contains G as a lattice has at least two noncocompact factors. We use results from Bestvina-Eskin-Wortman and Cornulier-Tessera to show that G has a polynomially bounded Dehn function.
Type Text
Publisher University of Utah
Subject Arithmetic Group; Coarse manifolds; Dehn Function; Geometric Group Theory; Lattices in Lie Groups
Dissertation Name Doctor of Philosophy
Language eng
Rights Management ©Morgan Lindsey baker Cesa
Format application/pdf
Format Medium application/pdf
ARK ark:/87278/s6g205vt
Setname ir_etd
ID 1356123
Reference URL https://collections.lib.utah.edu/ark:/87278/s6g205vt
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