Geometry, Topology, and Dynamics in Negative Curvature
Title | Geometry, Topology, and Dynamics in Negative Curvature PDF eBook |
Author | C. S. Aravinda |
Publisher | Cambridge University Press |
Pages | 378 |
Release | 2016-01-21 |
Genre | Mathematics |
ISBN | 1316539180 |
The ICM 2010 satellite conference 'Geometry, Topology and Dynamics in Negative Curvature' afforded an excellent opportunity to discuss various aspects of this fascinating interdisciplinary subject in which methods and techniques from geometry, topology, and dynamics often interact in novel and interesting ways. Containing ten survey articles written by some of the leading experts in the field, this proceedings volume provides an overview of important recent developments relating to negative curvature. Topics covered include homogeneous dynamics, harmonic manifolds, the Atiyah Conjecture, counting circles and arcs, and hyperbolic buildings. Each author pays particular attention to the expository aspects, making the book particularly useful for graduate students and mathematicians interested in transitioning from other areas via the common theme of negative curvature.
Geometry, Topology, and Dynamics in Negative Curvature
Title | Geometry, Topology, and Dynamics in Negative Curvature PDF eBook |
Author | C. S. Aravinda |
Publisher | Cambridge University Press |
Pages | 378 |
Release | 2016-01-21 |
Genre | Mathematics |
ISBN | 110752900X |
Ten high-quality survey articles provide an overview of important recent developments in the mathematics surrounding negative curvature.
Ergodic Theory and Negative Curvature
Title | Ergodic Theory and Negative Curvature PDF eBook |
Author | Boris Hasselblatt |
Publisher | Springer |
Pages | 334 |
Release | 2017-12-15 |
Genre | Mathematics |
ISBN | 3319430599 |
Focussing on the mathematics related to the recent proof of ergodicity of the (Weil–Petersson) geodesic flow on a nonpositively curved space whose points are negatively curved metrics on surfaces, this book provides a broad introduction to an important current area of research. It offers original textbook-level material suitable for introductory or advanced courses as well as deep insights into the state of the art of the field, making it useful as a reference and for self-study. The first chapters introduce hyperbolic dynamics, ergodic theory and geodesic and horocycle flows, and include an English translation of Hadamard's original proof of the Stable-Manifold Theorem. An outline of the strategy, motivation and context behind the ergodicity proof is followed by a careful exposition of it (using the Hopf argument) and of the pertinent context of Teichmüller theory. Finally, some complementary lectures describe the deep connections between geodesic flows in negative curvature and Diophantine approximation.
Wigner-Type Theorems for Hilbert Grassmannians
Title | Wigner-Type Theorems for Hilbert Grassmannians PDF eBook |
Author | Mark Pankov |
Publisher | Cambridge University Press |
Pages | 155 |
Release | 2020-01-16 |
Genre | Mathematics |
ISBN | 1108848397 |
Wigner's theorem is a fundamental part of the mathematical formulation of quantum mechanics. The theorem characterizes unitary and anti-unitary operators as symmetries of quantum mechanical systems, and is a key result when relating preserver problems to quantum mechanics. At the heart of this book is a geometric approach to Wigner-type theorems, unifying both classical and more recent results. Readers are initiated in a wide range of topics from geometric transformations of Grassmannians to lattices of closed subspaces, before moving on to a discussion of applications. An introduction to all the key aspects of the basic theory is included as are plenty of examples, making this book a useful resource for beginning graduate students and non-experts, as well as a helpful reference for specialist researchers.
(Co)end Calculus
Title | (Co)end Calculus PDF eBook |
Author | Fosco Loregian |
Publisher | Cambridge University Press |
Pages | 331 |
Release | 2021-07-22 |
Genre | Mathematics |
ISBN | 1108746128 |
This easy-to-cite handbook gives the first systematic treatment of the (co)end calculus in category theory and its applications.
Discrete Quantum Walks on Graphs and Digraphs
Title | Discrete Quantum Walks on Graphs and Digraphs PDF eBook |
Author | Chris Godsil |
Publisher | Cambridge University Press |
Pages | 152 |
Release | 2023-01-12 |
Genre | Mathematics |
ISBN | 1009261703 |
Discrete quantum walks are quantum analogues of classical random walks. They are an important tool in quantum computing and a number of algorithms can be viewed as discrete quantum walks, in particular Grover's search algorithm. These walks are constructed on an underlying graph, and so there is a relation between properties of walks and properties of the graph. This book studies the mathematical problems that arise from this connection, and the different classes of walks that arise. Written at a level suitable for graduate students in mathematics, the only prerequisites are linear algebra and basic graph theory; no prior knowledge of physics is required. The text serves as an introduction to this important and rapidly developing area for mathematicians and as a detailed reference for computer scientists and physicists working on quantum information theory.
New Directions in Locally Compact Groups
Title | New Directions in Locally Compact Groups PDF eBook |
Author | Pierre-Emmanuel Caprace |
Publisher | Cambridge University Press |
Pages | 367 |
Release | 2018-02-08 |
Genre | Mathematics |
ISBN | 1108349544 |
This collection of expository articles by a range of established experts and newer researchers provides an overview of the recent developments in the theory of locally compact groups. It includes introductory articles on totally disconnected locally compact groups, profinite groups, p-adic Lie groups and the metric geometry of locally compact groups. Concrete examples, including groups acting on trees and Neretin groups, are discussed in detail. An outline of the emerging structure theory of locally compact groups beyond the connected case is presented through three complementary approaches: Willis' theory of the scale function, global decompositions by means of subnormal series, and the local approach relying on the structure lattice. An introduction to lattices, invariant random subgroups and L2-invariants, and a brief account of the Burger–Mozes construction of simple lattices are also included. A final chapter collects various problems suggesting future research directions.