Supermanifolds
著者
書誌事項
Supermanifolds
(Cambridge monographs on mathematical physics)
Cambridge University Press, 1992
2nd ed
- : hbk
- : pbk
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注記
Includes bibliographical references and index
内容説明・目次
内容説明
This is an updated and expanded second edition of a successful and well-reviewed text presenting a detailed exposition of the modern theory of supermanifolds, including a rigorous account of the super-analogs of all the basic structures of ordinary manifold theory. The exposition opens with the theory of analysis over supernumbers (Grassman variables), Berezin integration, supervector spaces and the superdeterminant. This basic material is then applied to the theory of supermanifolds, with an account of super-analogs of Lie derivatives, connections, metric, curvature, geodesics, Killing flows, conformal groups, etc. The book goes on to discuss the theory of super Lie groups, super Lie algebras, and invariant geometrical structures on coset spaces. Complete descriptions are given of all the simple super Lie groups. The book then turns to applications. Chapter 5 contains an account of the Peierals bracket for superclassical dynamical systems, super Hilbert spaces, path integration for fermionic quantum systems, and simple models of Bose-Fermi supersymmetry. The sixth and final chapter, which is new in this revised edition, examines dynamical systems for which the topology of the configuration supermanifold is important. A concise but complete account is given of the pathintegral derivation of the Chern-Gauss-Bonnet formula for the Euler-Poincare characteristic of an ordinary manifold, which is based on a simple extension of a point particle moving freely in this manifold to a supersymmetric dynamical system moving in an associated supermanifold. Many exercises are included to complement the text.
目次
- Preface to the first edition
- Preface to the second editin
- 1. Analysis over supernumbers
- 2. Supermanifolds
- 3. Super Lie groups: general theory
- 4. Super Lie groups: examples
- 5. Selected applications of supermanifold theory
- 6. Applications involving topology
- References
- Index.
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