Surveys in noncommutative geometry : proceedings from the Clay mathematics institute instructional symposium, held in conjuction with the AMS-IMS-SIAM joint summer research conference on noncommutative geometry, June 18-29, 2000, Mount Holyoke College, South Hadley, MA

Author(s)

    • AMS-IMS-SIAM Joint Summer Research Conference and Clay Mathematics Institute Instructional Symposium on Noncommutative Geometry (2000 : Mount Holyoke College)
    • Higson, Nigel

Bibliographic Information

Surveys in noncommutative geometry : proceedings from the Clay mathematics institute instructional symposium, held in conjuction with the AMS-IMS-SIAM joint summer research conference on noncommutative geometry, June 18-29, 2000, Mount Holyoke College, South Hadley, MA

Nigel Higson, John Roe, editors

(Clay mathematics proceedings, v. 6)

American Mathematical Society, c2006

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Includes bibliographical references

Description and Table of Contents

Description

In June 2000, the Clay Mathematics Institute organized an Instructional Symposium on Noncommutative Geometry in conjunction with the AMS-IMS-SIAM Joint Summer Research Conference. These events were held at Mount Holyoke College in Massachusetts from June 18 to 29, 2000. The Instructional Symposium consisted of several series of expository lectures which were intended to introduce key topics in noncommutative geometry to mathematicians unfamiliar with the subject.Those expository lectures have been edited and are reproduced in this volume. The lectures of Rosenberg and Weinberger discuss various applications of noncommutative geometry to problems in 'ordinary' geometry and topology. The lectures of Lagarias and Tretkoff discuss the Riemann hypothesis and the possible application of the methods of noncommutative geometry in number theory. Higson gives an account of the 'residue index theorem' of Connes and Moscovici. Noncommutative geometry is to an unusual extent the creation of a single mathematician, Alain Connes. The present volume gives an extended introduction to several aspects of Connes' work in this fascinating area.

Table of Contents

A minicourse on applications of non-commutative geometry to topology by J. Rosenberg On Novikov-type conjectures by S. S. Chang and S. Weinberger The residue index theorem of Connes and Moscovici by N. Higson The Riemann hypothesis: Arithmetic and geometry by J. C. Lagarias Noncommutative geometry and number theory by P. Tretkoff.

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