04473nam 22006735 450 991015867140332120200703130043.010.1007/978-81-322-3667-2(CKB)3710000001008957(MiAaPQ)EBC4777482(DE-He213)978-81-322-3667-2(PPN)198342470(EXLCZ)99371000000100895720170105d2016 u| 0engurcnu||||||||rdacontentrdamediardacarrierQuantum Isometry Groups[electronic resource] /by Debashish Goswami, Jyotishman Bhowmick1st ed. 2016.New Delhi :Springer India :Imprint: Springer,2016.1 online resource (254 pages)Infosys Science Foundation Series in Mathematical Sciences,2364-403681-322-3665-3 81-322-3667-X Includes bibliographical references at the end of each chapters.Chapter 1. Introduction -- Chapter 2. Preliminaries -- Chapter 3. Classical and Noncommutative Geometry -- Chapter 4. Definition and Existence of Quantum Isometry Groups -- Chapter 5. Quantum Isometry Groups of Classical and Quantum -- Chapter 6. Quantum Isometry Groups of Discrete Quantum Spaces -- Chapter 7. Nonexistence of Genuine Smooth CQG Actions on Classical Connected Manifolds -- Chapter 8. Deformation of Spectral Triples and Their Quantum Isometry Groups -- Chapter 9. More Examples and Computations -- Chapter 10. Spectral Triples and Quantum Isometry Groups on Group C*-Algebras.This book offers an up-to-date overview of the recently proposed theory of quantum isometry groups. Written by the founders, it is the first book to present the research on the “quantum isometry group”, highlighting the interaction of noncommutative geometry and quantum groups, which is a noncommutative generalization of the notion of group of isometry of a classical Riemannian manifold. The motivation for this generalization is the importance of isometry groups in both mathematics and physics. The framework consists of Alain Connes’ “noncommutative geometry” and the operator-algebraic theory of “quantum groups”. The authors prove the existence of quantum isometry group for noncommutative manifolds given by spectral triples under mild conditions and discuss a number of methods for computing them. One of the most striking and profound findings is the non-existence of non-classical quantum isometry groups for arbitrary classical connected compact manifolds and, by using this, the authors explicitly describe quantum isometry groups of most of the noncommutative manifolds studied in the literature. Some physical motivations and possible applications are also discussed.Infosys Science Foundation Series in Mathematical Sciences,2364-4036Global analysis (Mathematics)Manifolds (Mathematics)Mathematical physicsDifferential geometryFunctional analysisQuantum physicsGlobal Analysis and Analysis on Manifoldshttps://scigraph.springernature.com/ontologies/product-market-codes/M12082Mathematical Physicshttps://scigraph.springernature.com/ontologies/product-market-codes/M35000Differential Geometryhttps://scigraph.springernature.com/ontologies/product-market-codes/M21022Functional Analysishttps://scigraph.springernature.com/ontologies/product-market-codes/M12066Quantum Physicshttps://scigraph.springernature.com/ontologies/product-market-codes/P19080Global analysis (Mathematics).Manifolds (Mathematics).Mathematical physics.Differential geometry.Functional analysis.Quantum physics.Global Analysis and Analysis on Manifolds.Mathematical Physics.Differential Geometry.Functional Analysis.Quantum Physics.530.12Goswami Debashishauthttp://id.loc.gov/vocabulary/relators/aut300721Bhowmick Jyotishmanauthttp://id.loc.gov/vocabulary/relators/autBOOK9910158671403321Quantum Isometry Groups2129505UNINA