Description
Book SynopsisFrom the Preface: K-theory was introduced by A. Grothendieck in his formulation of the Riemann- Roch theorem. For each projective algebraic variety, Grothendieck constructed a group from the category of coherent algebraic sheaves, and showed that it had many nice properties. Atiyah and Hirzebruch considered a topological analog defined for any compact space
X, a group
K{X) constructed from the category of vector bundles on X. It is this ''topological
K-theory" that this book will study. Topological
K-theory has become an important tool in topology. Using
K- theory, Adams and Atiyah were able to give a simple proof that the only spheres which can be provided with
H-space structures are S1, S3 and S7. Moreover, it is possible to derive a substantial part of stable homotopy theory from K-theory.
The purpose of this book is to provide advanced students and mathematicians in other fields with the fundamental material in this subject. In addition, several applications of the type described above are included. In general we have tried to make this book self-contained, beginning with elementary concepts wherever possible; however, we assume that the reader is familiar with the basic definitions of homotopy theory: homotopy classes of maps and homotopy groups.Thus this book might be regarded as a fairly self-contained introduction to a "generalized cohomology theory".
Trade ReviewFrom the reviews:
"Karoubi’s classic K-Theory, An Introduction … is ‘to provide advanced students and mathematicians in other fields with the fundamental material in this subject’. … K-Theory, An Introduction is a phenomenally attractive book: a fantastic introduction and then some. … serve as a fundamental reference and source of instruction for outsiders who would be fellow travelers." (Michael Berg, MAA Online, December, 2008)
Table of ContentsVector Bundles.- First Notions of K-Theory.- Bott Periodicity.- Computation of Some K-Groups.- Some Applications of K-Theory.- Vector Bundles.- First Notions of K-Theory.- Bott Periodicity.- Computation of Some K-Groups.
