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Accueil > Publications > Lectures in Mathematics & Theoretical Physics > Volume 22 : Handbook of Hilbert Geometry
Volume 22 : Handbook of Hilbert Geometry
Editors :
Athanase Papadopoulos (Université de Strasbourg, France)
Marc Troyanov (École Polytechnique Fédérale de Lausanne, Switzerland)
ISBN 978-3-03719-147-7
DOI 10.4171/147
December 2014, 460 pages, hardcover, 17 x 24 cm.
78.00 Euro
This volume presents surveys, written by experts in the field, on various classical and the modern aspects of Hilbert geometry. They are assuming several points of view : Finsler geometry, calculus of variations, projective geometry, dynamical systems, and others. Some fruitful relations between Hilbert geometry and other subjects in mathematics are emphasized, including Teichmüller spaces, convexity theory, Perron–Frobenius theory, representation theory, partial differential equations, coarse geometry, ergodic theory, algebraic groups, Coxeter groups, geometric group theory, Lie groups and discrete group actions.
The Handbook is addressed to both students who want to learn the theory and researchers working in the area.
Relevant information and order form are available on EMS web site.
Dernière mise à jour le 23-03-2020
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- Présentation
- Volume 32 : Algebraic Combinatorics, Resurgence, Moulds and Applications (CARMA) Volume 2
- Volume 31 : Algebraic Combinatorics, Resurgence, Moulds and Applications (CARMA) Volume 1
- Volume 30 : Handbook of Teichmüller Theory, Volume VII
- Volume 29 : Eighteen Essays in Non-Euclidean Geometry
- Volume 28 : Linear Forms in Logarithms and Applications
- Volume 27 : Handbook of Teichmüller Theory, Volume VI
- Volume 26 : Handbook of Teichmüller Theory, Volume V
- Volume 25 : Metric Measure Geometry. Gromov’s Theory of Convergence and Concentration of Metrics and Measures
- Volume 24 : Free Loop Spaces in Geometry and Topology
- Volume 23 : Sophus Lie and Felix Klein : The Erlangen Program and Its Impact in Mathematics and Physics.
- Volume 21 : Faà di Bruno Hopf Algebras, Dyson–Schwinger Equations, and Lie–Butcher Series.
- Volume 20 : Singularities in Geometry and Topology
- Volume 19 : Handbook of Teichmüller Theory, Volume IV
- Volume 18 : Strasbourg Master Class on Geometry
- Volume 17 : Handbook of Teichmüller Theory, Volume III
- Volume 16 : Handbook of Pseudo-Riemannian Geometry and Supersymmetry
- Volume 15 : Renormalization and Galois Theories
- Volume 14 : Dynamical Systems and Processes
- Volume 13 : Handbook of Teichmüler Theory, volume II
- Volume 12 : Quantum Groups
- Volume 11 : Handbook of Teichmüller Theory, Volume I
- Volume 10 : Physics and Number Theory
- Volume 09 : Differential Equations and Quantum Groups
- Volume 08 : AdS/CFT Correspondence : Einstein Metrics and Their Conformal Boundaries
- Volume 07 : Numerical Methods for Hyperbolic and Kinetic Problems
- Volume 06 : Metric Spaces, Convexity and Nonpositive Curvature
- Volume 05 : Infinite Dimensional Groups and Manifolds
- Volume 04 : Three Courses on Partial Differential Equations
- Volume 03 : From Combinatorics to Dynamical Systems
