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Quantum Riemannian geometry

Beggs, Edwin J.

Quantum Riemannian geometry

紀錄類型:	書目-電子資源 : Monograph/item
正題名/作者:	Quantum Riemannian geometryby Edwin J. Beggs, Shahn Majid.
作者:	Beggs, Edwin J.
其他作者:	Majid, Shahn.
出版者:	Cham :Springer International Publishing :2020.
面頁冊數:	xvi, 809 p. :ill., digital ;24 cm.
Contained By:	Springer eBooks
標題:	Geometry, Riemannian.
電子資源:	https://doi.org/10.1007/978-3-030-30294-8
ISBN:	9783030302948$q(electronic bk.)

Quantum Riemannian geometry
Beggs, Edwin J.

Quantum Riemannian geometry[electronic resource] /by Edwin J. Beggs, Shahn Majid. - Cham :Springer International Publishing :2020. - xvi, 809 p. :ill., digital ;24 cm. - Grundlehren der mathematischen wissenschaften,v.3550072-7830 ;. - Grundlehren der mathematischen wissenschaften ;342..

Differentials On An Algebra -- Hopf Algebras and Their Bicovariant Calculi -- Vector Bundles and Connections -- Curvature, Cohomology and Sheaves -- Quantum Principal Bundles and Framings -- Vector Fields and Differential Operators -- Quantum Complex Structures -- Quantum Riemannian Structures -- Quantum Spacetime -- Solutions -- References -- Index.

This book provides a comprehensive account of a modern generalisation of differential geometry in which coordinates need not commute. This requires a reinvention of differential geometry that refers only to the coordinate algebra, now possibly noncommutative, rather than to actual points. Such a theory is needed for the geometry of Hopf algebras or quantum groups, which provide key examples, as well as in physics to model quantum gravity effects in the form of quantum spacetime. The mathematical formalism can be applied to any algebra and includes graph geometry and a Lie theory of finite groups. Even the algebra of 2 x 2 matrices turns out to admit a rich moduli of quantum Riemannian geometries. The approach taken is a 'bottom up' one in which the different layers of geometry are built up in succession, starting from differential forms and proceeding up to the notion of a quantum 'Levi-Civita' bimodule connection, geometric Laplacians and, in some cases, Dirac operators.The book also covers elements of Connes' approach to the subject coming from cyclic cohomology and spectral triples. Other topics include various other cohomology theories, holomorphic structures and noncommutative D-modules. A unique feature of the book is its constructive approach and its wealth of examples drawn from a large body of literature in mathematical physics, now put on a firm algebraic footing. Including exercises with solutions, it can be used as a textbook for advanced courses as well as a reference for researchers.

ISBN: 9783030302948$q(electronic bk.)

Standard No.: 10.1007/978-3-030-30294-8doiSubjects--Topical Terms:

191082
Geometry, Riemannian.

LC Class. No.: QA649 / .B444 2020

Dewey Class. No.: 516.373

Quantum Riemannian geometry
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490 1 $a Grundlehren der mathematischen wissenschaften, $x 0072-7830 ; $v v.355
505 0 $a Differentials On An Algebra -- Hopf Algebras and Their Bicovariant Calculi -- Vector Bundles and Connections -- Curvature, Cohomology and Sheaves -- Quantum Principal Bundles and Framings -- Vector Fields and Differential Operators -- Quantum Complex Structures -- Quantum Riemannian Structures -- Quantum Spacetime -- Solutions -- References -- Index.
520 $a This book provides a comprehensive account of a modern generalisation of differential geometry in which coordinates need not commute. This requires a reinvention of differential geometry that refers only to the coordinate algebra, now possibly noncommutative, rather than to actual points. Such a theory is needed for the geometry of Hopf algebras or quantum groups, which provide key examples, as well as in physics to model quantum gravity effects in the form of quantum spacetime. The mathematical formalism can be applied to any algebra and includes graph geometry and a Lie theory of finite groups. Even the algebra of 2 x 2 matrices turns out to admit a rich moduli of quantum Riemannian geometries. The approach taken is a 'bottom up' one in which the different layers of geometry are built up in succession, starting from differential forms and proceeding up to the notion of a quantum 'Levi-Civita' bimodule connection, geometric Laplacians and, in some cases, Dirac operators.The book also covers elements of Connes' approach to the subject coming from cyclic cohomology and spectral triples. Other topics include various other cohomology theories, holomorphic structures and noncommutative D-modules. A unique feature of the book is its constructive approach and its wealth of examples drawn from a large body of literature in mathematical physics, now put on a firm algebraic footing. Including exercises with solutions, it can be used as a textbook for advanced courses as well as a reference for researchers.
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650 0 $a Geometric quantization. $3 230046
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650 2 4 $a Differential Geometry. $3 273785
650 2 4 $a Associative Rings and Algebras. $3 274818
650 2 4 $a Group Theory and Generalizations. $3 274819
700 1 $a Majid, Shahn. $3 861047
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