PREFACETOTHESECONDEDITION
PREFACE
I.WHYSUPERSYMMETRY?
II.REPRESENTATIONSOFTHESUPERSYMMETRYALGEBRA
III.COMPONENTFIELDS
IV.SUPERFIELDS
V.CHIRALSUPERFIELDS
VI.VECTORSUPERFIELDS
VII.GAUGEINVARIANTINTERACTIONS
VIII.SPONTANEOUSSYMMETRYBREAKING
IX.SUPERFIELDPROPAGATORS
X.FEYNMANRULESFORSUPERGRAPHS
XI.NONLINEARREALIZATIONS
XII.DIFFERENTIALFORMSINSUPERSPACE
XIII.GAUGETHEORIESREVISITED
XIV.VIELBEIN,TORSION,ANDCURVATURE
XV.BIANCHIIDENTITIES
XVI.SUPERGAUGETRANSFORMATIONS
XVII.THE0=0=0COMPONENTSOFTHEVIELBEIN,CONNECTION,TORSION,ANDCURVATURE
XVIII.THESUPERGRAVITYMULTIPLET
XIX.CHIRALANDVECTORSUPERFIELDSINCURVEDSPACE
XX.NEWVARIABLESANDTHECHIRALDENSITY
XXI.THEMINIMALCHIRALSUPERGRAVITYMODEL
XXII.CHIRALMODELSANDKAHLERGEOMETRY
XXIII.GENERALCHIRALSUPERGRAVITYMODELS
XXIV.GAUGEINVARIANTMODELS
XXV.GAUGEINVARIANTSUPERGRAVITYMODELS
XXVI.LOW-ENERGYTHEOREMS
APPENDIXA:NotationandSpinorAlgebra
APPENDIXB:ResultsinSpinorAlgebra
APPENDIXC:KahlerGeometry
APPENDIXD:IsometriesandKahlerGeometry
APPENDIXE:NonlinearRealizations
APPENDIXF:NonlinearRealizationsandInvariantActions
APPENDIXG:GaugeInvariantSupergravityModels