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Chapter 8. Hypoelliptic and elliptic torsions: a comparison formula

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The Hypoelliptic Laplacian and Ray-Singer Metrics
This chapter is in the book The Hypoelliptic Laplacian and Ray-Singer Metrics

Chapters in this book

  1. Frontmatter i
  2. Contents v
  3. Introduction 1
  4. Chapter 1. Elliptic Riemann-Roch-Grothendieck and flat vector bundles 11
  5. Chapter 2. The hypoelliptic Laplacian on the cotangent bundle 25
  6. Chapter 3. Hodge theory, the hypoelliptic Laplacian and its heat kernel 44
  7. Chapter 4. Hypoelliptic Laplacians and odd Chern forms 62
  8. Chapter 5. The limit as t → +∞ and b → 0 of the superconnection forms 98
  9. Chapter 6. Hypoelliptic torsion and the hypoelliptic Ray-Singer metrics 113
  10. Chapter 7. The hypoelliptic torsion forms of a vector bundle 131
  11. Chapter 8. Hypoelliptic and elliptic torsions: a comparison formula 162
  12. Chapter 9. A comparison formula for the Ray-Singer metrics 171
  13. Chapter 10. The harmonic forms for b → 0 and the formal Hodge theorem 173
  14. Chapter 11. A proof of equation (8.4.6) 182
  15. Chapter 12. A proof of equation (8.4.8) 190
  16. Chapter 13. A proof of equation (8.4.7) 194
  17. Chapter 14. The integration by parts formula 214
  18. Chapter 15. The hypoelliptic estimates 224
  19. Chapter 16. Harmonic oscillator and the J0 function 247
  20. Chapter 17. The limit of A'2φb,±H as b → 0 264
  21. Bibliography 353
  22. Subject Index 359
  23. Index of Notation 361
https://doi.org/10.1515/9781400829064-009

Chapters in this book

  1. Frontmatter i
  2. Contents v
  3. Introduction 1
  4. Chapter 1. Elliptic Riemann-Roch-Grothendieck and flat vector bundles 11
  5. Chapter 2. The hypoelliptic Laplacian on the cotangent bundle 25
  6. Chapter 3. Hodge theory, the hypoelliptic Laplacian and its heat kernel 44
  7. Chapter 4. Hypoelliptic Laplacians and odd Chern forms 62
  8. Chapter 5. The limit as t → +∞ and b → 0 of the superconnection forms 98
  9. Chapter 6. Hypoelliptic torsion and the hypoelliptic Ray-Singer metrics 113
  10. Chapter 7. The hypoelliptic torsion forms of a vector bundle 131
  11. Chapter 8. Hypoelliptic and elliptic torsions: a comparison formula 162
  12. Chapter 9. A comparison formula for the Ray-Singer metrics 171
  13. Chapter 10. The harmonic forms for b → 0 and the formal Hodge theorem 173
  14. Chapter 11. A proof of equation (8.4.6) 182
  15. Chapter 12. A proof of equation (8.4.8) 190
  16. Chapter 13. A proof of equation (8.4.7) 194
  17. Chapter 14. The integration by parts formula 214
  18. Chapter 15. The hypoelliptic estimates 224
  19. Chapter 16. Harmonic oscillator and the J0 function 247
  20. Chapter 17. The limit of A'2φb,±H as b → 0 264
  21. Bibliography 353
  22. Subject Index 359
  23. Index of Notation 361
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