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XXIV. GAUGE INVARIANT MODELS

  • Julius Wess and Jonathan Bagger
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Supersymmetry and Supergravity
This chapter is in the book Supersymmetry and Supergravity
© 2020 Princeton University Press, Princeton

© 2020 Princeton University Press, Princeton

Chapters in this book

  1. Frontmatter i
  2. CONTENTS vii
  3. PREFACE TO THE SECOND EDITION ix
  4. PREFACE x
  5. I. WHY SUPERSYMMETRY? 1
  6. II. REPRESENTATIONS OF THE SUPERSYMMETRY ALGEBRA 11
  7. III. COMPONENT FIELDS 21
  8. IV. SUPERFIELDS 25
  9. V. CHIRAL SUPERFIELDS 30
  10. VI. VECTOR SUPERFIELDS 36
  11. VII. GAUGE INVARIANT INTERACTIONS 43
  12. VIII. SPONTANEOUS SYMMETRY BREAKING 51
  13. IX. SUPERFIELD PROPAGATORS 61
  14. X. FEYNMAN RULES FOR SUPERGRAPHS 79
  15. XI. NONLINEAR REALIZATIONS 88
  16. XII. DIFFERENTIAL FORMS IN SUPERSPACE 93
  17. XIII. GAUGE THEORIES REVISITED 101
  18. XIV. VIELBEIN, TORSION, AND CURVATURE 109
  19. XV. BIANCHI IDENTITIES 117
  20. XVI. SUPERGAUGE TRANSFORMATIONS 127
  21. XVII. THE Ɵ = Ō = 0 COMPONENTS OF THE VIELBEIN, CONNECTION, TORSION, AND CURVATURE 132
  22. XVIII. THE SUPERGRAVITY MULTIPLET 140
  23. XIX. CHIRAL AND VECTOR SUPERFIELDS IN CURVED SPACE 146
  24. XX. NEW Ɵ VARIABLES AND THE CHIRAL DENSITY 155
  25. XXI. THE MINIMAL CHIRAL SUPERGRAVITY MODEL 162
  26. XXII. CHIRAL MODELS AND KAHLER GEOMETRY 175
  27. XXIII. GENERAL CHIRAL SUPERGRAVITY MODELS 180
  28. XXIV. GAUGE INVARIANT MODELS 192
  29. XXV. GAUGE INVARIANT SUPERGRAVITY MODELS 204
  30. XXVI. LOW-ENERGY THEOREMS 217
  31. APPENDIX A: Notation and Spinor Algebra 225
  32. APPENDIX B: Results in Spinor Algebra 232
  33. APPENDIX C: Kahler Geometry 235
  34. APPENDIX D: Isometries and Kahler Geometry 239
  35. APPENDIX E: Nonlinear Realizations 245
  36. APPENDIX F: Nonlinear Realizations and Invariant Actions 253
  37. APPENDIX G: Gauge Invariant Supergravity Models 256
https://doi.org/10.1515/9780691212937-026

Chapters in this book

  1. Frontmatter i
  2. CONTENTS vii
  3. PREFACE TO THE SECOND EDITION ix
  4. PREFACE x
  5. I. WHY SUPERSYMMETRY? 1
  6. II. REPRESENTATIONS OF THE SUPERSYMMETRY ALGEBRA 11
  7. III. COMPONENT FIELDS 21
  8. IV. SUPERFIELDS 25
  9. V. CHIRAL SUPERFIELDS 30
  10. VI. VECTOR SUPERFIELDS 36
  11. VII. GAUGE INVARIANT INTERACTIONS 43
  12. VIII. SPONTANEOUS SYMMETRY BREAKING 51
  13. IX. SUPERFIELD PROPAGATORS 61
  14. X. FEYNMAN RULES FOR SUPERGRAPHS 79
  15. XI. NONLINEAR REALIZATIONS 88
  16. XII. DIFFERENTIAL FORMS IN SUPERSPACE 93
  17. XIII. GAUGE THEORIES REVISITED 101
  18. XIV. VIELBEIN, TORSION, AND CURVATURE 109
  19. XV. BIANCHI IDENTITIES 117
  20. XVI. SUPERGAUGE TRANSFORMATIONS 127
  21. XVII. THE Ɵ = Ō = 0 COMPONENTS OF THE VIELBEIN, CONNECTION, TORSION, AND CURVATURE 132
  22. XVIII. THE SUPERGRAVITY MULTIPLET 140
  23. XIX. CHIRAL AND VECTOR SUPERFIELDS IN CURVED SPACE 146
  24. XX. NEW Ɵ VARIABLES AND THE CHIRAL DENSITY 155
  25. XXI. THE MINIMAL CHIRAL SUPERGRAVITY MODEL 162
  26. XXII. CHIRAL MODELS AND KAHLER GEOMETRY 175
  27. XXIII. GENERAL CHIRAL SUPERGRAVITY MODELS 180
  28. XXIV. GAUGE INVARIANT MODELS 192
  29. XXV. GAUGE INVARIANT SUPERGRAVITY MODELS 204
  30. XXVI. LOW-ENERGY THEOREMS 217
  31. APPENDIX A: Notation and Spinor Algebra 225
  32. APPENDIX B: Results in Spinor Algebra 232
  33. APPENDIX C: Kahler Geometry 235
  34. APPENDIX D: Isometries and Kahler Geometry 239
  35. APPENDIX E: Nonlinear Realizations 245
  36. APPENDIX F: Nonlinear Realizations and Invariant Actions 253
  37. APPENDIX G: Gauge Invariant Supergravity Models 256
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