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K-Theory and Noncommutative Geometry / Guillermo Cortiñas.

EBSCOhost Academic eBook Collection (North America) Available online

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Format:
Book
Author/Creator:
Cortiñas, Guillermo, author.
Series:
EMS series of congress reports.
EMS series of congress reports
Language:
English
Subjects (All):
K-theory.
Noncommutative differential geometry.
Physical Description:
1 online resource (454 p.)
Place of Publication:
Zürich, Switzerland : European Mathematical Society, 2008.
Summary:
Since its inception 50 years ago, K-theory has been a tool for understanding a wide-ranging family of mathematical structures and their invariants: topological spaces, rings, algebraic varieties and operator algebras are the dominant examples. The invariants range from characteristic classes in cohomology, determinants of matrices, Chow groups of varieties, as well as traces and indices of elliptic operators. Thus K-theory is notable for its connections with other branches of mathematics. Noncommutative geometry develops tools which allow one to think of noncommutative algebras in the same footing as commutative ones: as algebras of functions on (noncommutative) spaces. The algebras in question come from problems in various areas of mathematics and mathematical physics; typical examples include algebras of pseudodifferential operators, group algebras, and other algebras arising from quantum field theory. To study noncommutative geometric problems one considers invariants of the relevant noncommutative algebras. These invariants include algebraic and topological K-theory, and also cyclic homology, discovered independently by Alain Connes and Boris Tsygan, which can be regarded both as a noncommutative version of de Rham cohomology and as an additive version of K-theory. There are primary and secondary Chern characters which pass from K-theory to cyclic homology. These characters are relevant both to noncommutative and commutative problems and have applications ranging from index theorems to the detection of singularities of commutative algebraic varieties. The contributions to this volume represent this range of connections between K-theory, noncommmutative geometry, and other branches of mathematics.
Notes:
Description based on publisher supplied metadata and other sources.

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