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Structure of Groups with a Quasiconvex Hierarchy

Daniel T. Wise
€84.99
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Abelian group
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Artin group
Author_Daniel T. Wise
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Automorphism
Basis (linear algebra)
Braid group
C0
Category1=Non-Fiction
Category=PB
Category=PBG
Category=PBM
Category=PBP
Cayley graph
Characteristic subgroup
Combination
Combinatorial group theory
Combinatorial map
Commutator
Conjugacy class
Connected space
Convex set
COP=United States
Coset
Counterexample
Coxeter group
Curvature
Cyclic group
Degeneracy (mathematics)
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Diagram (category theory)
Dimension
Dimension (vector space)
Disjoint sets
Disjoint union
Double coset
Dual curve
Dual graph
eq_isMigrated=2
eq_nobargain
Equivalence class
Equivalence relation
Euler characteristic
Fiber bundle
Fundamental group
Generating set of a group
Graph of groups
HNN extension
Homotopy
Hyperbolic 3-manifold
Hyperbolic group
Hyperplane
Inclusion map
Incompressible surface
Induced path
Infimum and supremum
Injective function
Intersection (set theory)
Language_English
Lexicographical order
Metric space
Mobius transformation
Monogon
PA=Available
Parity (mathematics)
Price_€50 to €100
PS=Active
Quasi-isometry
Quasiconvex function
Quotient space (topology)
Rectangle
Relatively hyperbolic group
Simplicial complex
softlaunch
Special case
Subgroup
Subsequence
Summation
Theorem
Topological space
Topology
Torsion group
Total order
Tree (data structure)
Triangle group
Virtually

Product details

  • ISBN 9780691170459
  • Dimensions: 155 x 235mm
  • Publication Date: 04 May 2021
  • Publisher: Princeton University Press
  • Publication City/Country: US
  • Product Form: Paperback
  • Language: English
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Description

This monograph on the applications of cube complexes constitutes a breakthrough in the fields of geometric group theory and 3-manifold topology. Many fundamental new ideas and methodologies are presented here for the first time, including a cubical small-cancellation theory that generalizes ideas from the 1960s, a version of Dehn Filling that functions in the category of special cube complexes, and a variety of results about right-angled Artin groups. The book culminates by establishing a remarkable theorem about the nature of hyperbolic groups that are constructible as amalgams.

The applications described here include the virtual fibering of cusped hyperbolic 3-manifolds and the resolution of Baumslag's conjecture on the residual finiteness of one-relator groups with torsion. Most importantly, this work establishes a cubical program for resolving Thurston's conjectures on hyperbolic 3-manifolds, and validates this program in significant cases. Illustrated with more than 150 color figures, this book will interest graduate students and researchers working in geometry, algebra, and topology.
About Daniel T. Wise
Daniel T. Wise is James McGill Professor in the Department of Mathematics and Statistics at McGill University. His previous book is From Riches to Raags: 3-Manifolds, Right-Angled Artin Groups, and Cubical Geometry.

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