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Supergeometry, Super Riemann Surfaces and the Superconformal Action Functional: Lecture Notes in Mathematics, cartea 2230

Autor Enno Keßler
en Limba Engleză Paperback – 29 aug 2019
This book treats the two-dimensional non-linear supersymmetric sigma model or spinning string from the perspective of supergeometry. The objective is to understand its symmetries as geometric properties of super Riemann surfaces, which are particular complex super manifolds of dimension 1|1.
The first part gives an introduction to the super differential geometry of families of super manifolds. Appropriate generalizations of principal bundles, smooth families of complex manifolds and integration theory are developed.
The second part studies uniformization, U(1)-structures and connections on Super Riemann surfaces and shows how the latter can be viewed as extensions of Riemann surfaces by a gravitino field. A natural geometric action functional on super Riemann surfaces is shown to reproduce the action functional of the non-linear supersymmetric sigma model using a component field formalism. The conserved currents of this action can be identified as infinitesimal deformations of the super Riemann surface. This is in surprising analogy to the theory of Riemann surfaces and the harmonic action functional on them. This volume is aimed at both theoretical physicists interested in a careful treatment of the subject and mathematicians who want to become acquainted with the potential applications of this beautiful theory.
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Specificații

ISBN-13: 9783030137571
ISBN-10: 3030137570
Pagini: 280
Ilustrații: XIII, 305 p. 51 illus.
Dimensiuni: 155 x 235 mm
Greutate: 0.45 kg
Ediția:1st ed. 2019
Editura: Springer International Publishing
Colecția Springer
Seria Lecture Notes in Mathematics

Locul publicării:Cham, Switzerland

Cuprins

Introduction.- PART I Super Differential Geometry.- Linear Superalgebra.- Supermanifolds.- Vector Bundles.- Super Lie Groups.- Principal Fiber Bundles.- Complex Supermanifolds.- Integration.- PART II Super Riemann Surfaces.- Super Riemann Surfaces and Reductions of the Structure Group.- Connections on Super Riemann Surfaces.- Metrics and Gravitinos.- The Superconformal Action Functional.- Computations in Wess–Zumino Gauge.

Notă biografică

Enno Keßler has studied Mathematics in Leipzig and Rennes. In 2017, he obtained his PhD from the Universität Leipzig while working at the Max-Planck-Institute for Mathematics in the Sciences. His current research interest is in geometry and mathematical physics where he focuses on super Riemann surfaces and their moduli. Besides Mathematics, Enno Keßler is passionate about cycling, open source software and agriculture.

Textul de pe ultima copertă

This book treats the two-dimensional non-linear supersymmetric sigma model or spinning string from the perspective of supergeometry. The objective is to understand its symmetries as geometric properties of super Riemann surfaces, which are particular complex super manifolds of dimension 1|1.
 The first part gives an introduction to the super differential geometry of families of super manifolds. Appropriate generalizations of principal bundles, smooth families of complex manifolds and integration theory are developed.
 The second part studies uniformization, U(1)-structures and connections on Super Riemann surfaces and shows how the latter can be viewed as extensions of Riemann surfaces by a gravitino field. A natural geometric action functional on super Riemann surfaces is shown to reproduce the action functional of the non-linear supersymmetric sigma model using a component field formalism. The conserved currents of this action can be identified as infinitesimal deformations of the super Riemann surface. This is in surprising analogy to the theory of Riemann surfaces and the harmonic action functional on them.
 This volume is aimed at both theoretical physicists interested in a careful treatment of the subject and mathematicians who want to become acquainted with the potential applications of this beautiful theory.


Caracteristici

Provides a detailed introduction to differential geometry on supermanifolds, including bundles, connections and integration
Focuses on super Riemann surfaces, supergeometric analogues of Riemann surfaces motivated by theoretical physics
Explains the relation between supergeometry and supersymmetry for the superconformal action on super Riemann surfaces