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Higher Index Theory

Hardback

Main Details

Title Higher Index Theory
Authors and Contributors      By (author) Rufus Willett
By (author) Guoliang Yu
SeriesCambridge Studies in Advanced Mathematics
Physical Properties
Format:Hardback
Pages:592
Dimensions(mm): Height 234,Width 158
Category/GenreCalculus and mathematical analysis
ISBN/Barcode 9781108491068
ClassificationsDewey:512.556
Audience
Professional & Vocational
Illustrations Worked examples or Exercises; 1 Halftones, black and white

Publishing Details

Publisher Cambridge University Press
Imprint Cambridge University Press
Publication Date 2 July 2020
Publication Country United Kingdom

Description

Index theory studies the solutions to differential equations on geometric spaces, their relation to the underlying geometry and topology, and applications to physics. If the space of solutions is infinite dimensional, it becomes necessary to generalise the classical Fredholm index using tools from the K-theory of operator algebras. This leads to higher index theory, a rapidly developing subject with connections to noncommutative geometry, large-scale geometry, manifold topology and geometry, and operator algebras. Aimed at geometers, topologists and operator algebraists, this book takes a friendly and concrete approach to this exciting theory, focusing on the main conjectures in the area and their applications outside of it. A well-balanced combination of detailed introductory material (with exercises), cutting-edge developments and references to the wider literature make this a valuable guide to this active area for graduate students and experts alike.

Author Biography

Rufus Willett is Professor of Mathematics at the University of Hawaii, Manoa. He has interdisciplinary research interests across large-scale geometry, K-theory, index theory, manifold topology and geometry, and operator algebras. Guoliang Yu is the Powell Chair in Mathematics and University Distinguished Professor at Texas A & M University. He was an invited speaker at the International Congress of Mathematicians in 2006, is a Fellow of the American Mathematical Society and a Simons Fellow in Mathematics. His research interests include large-scale geometry, K-theory, index theory, manifold topology and geometry, and operator algebras.

Reviews

'This book is an exceptional blend of clear, concise, delightfully written exposition and thorough scholarship. The book also has much to offer more experienced researchers.' Peter Haskell, European Mathematical Society