Supermanifolds

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Klappentext 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. Zusammenfassung 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. Many exercises are included to complement the text. Inhaltsverzeichnis 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.