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dc.creatorEmery, V
dc.creatorStover, M
dc.date.accessioned2021-02-03T19:06:47Z
dc.date.available2021-02-03T19:06:47Z
dc.date.issued2014-02-01
dc.identifier.issn0002-9327
dc.identifier.issn1080-6377
dc.identifier.doihttp://dx.doi.org/10.34944/dspace/5875
dc.identifier.otherAA8IQ (isidoc)
dc.identifier.urihttp://hdl.handle.net/20.500.12613/5893
dc.description.abstractThis paper studies the covolumes of nonuniform arithmetic lattices in PU(n,1). We determine the smallest covolume nonuniform arithmetic lattices for each n, the number of minimal covolume lattices for each n, and study the growth of the minimal covolume as n varies. In particular, there is a unique lattice (up to isomorphism) in PU(9,1) of smallest Euler-Poincaré characteristic amongst all nonuniform arithmetic lattices in PU(n,1).We also show that for each even n there are arbitrarily large families of nonisomorphic maximal nonuniform lattices in PU(n,1) of equal covolume. © 2014 by The Johns Hopkins University Press.
dc.format.extent143-164
dc.language.isoen
dc.relation.haspartAmerican Journal of Mathematics
dc.relation.isreferencedbyProject Muse
dc.subjectmath.GT
dc.subjectmath.GT
dc.subjectmath.GR
dc.subjectmath.NT
dc.titleCovolumes of nonuniform lattices in PU(n, 1)
dc.typeArticle
dc.type.genreJournal Article
dc.relation.doi10.1353/ajm.2014.0007
dc.ada.noteFor Americans with Disabilities Act (ADA) accommodation, including help with reading this content, please contact scholarshare@temple.edu
dc.date.updated2021-02-03T19:06:44Z
refterms.dateFOA2021-02-03T19:06:48Z


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