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Chapter 10. An upper bound for Green functions on Riemann surfaces

  • Franz Merkl
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Computational Aspects of Modular Forms and Galois Representations
This chapter is in the book Computational Aspects of Modular Forms and Galois Representations

Chapters in this book

  1. Frontmatter i
  2. Contents v
  3. Preface ix
  4. Acknowledgments x
  5. Author information xi
  6. Dependencies between the chapters xii
  7. Chapter 1. Introduction, main results, context 1
  8. Chapter 2. Modular curves, modular forms, lattices, Galois representations 29
  9. Chapter 3. First description of the algorithms 69
  10. Chapter 4. Short introduction to heights and Arakelov theory 79
  11. Chapter 5. Computing complex zeros of polynomials and power series 95
  12. Chapter 6. Computations with modular forms and Galois representations 129
  13. Chapter 7. Polynomials for projective representations of level one forms 159
  14. Chapter 8. Description of X1(5l) 173
  15. Chapter 9. Applying Arakelov theory 187
  16. Chapter 10. An upper bound for Green functions on Riemann surfaces 203
  17. Chapter 11. Bounds for Arakelov invariants of modular curves 217
  18. Chapter 12. Approximating Vf over the complex numbers 257
  19. Chapter 13. Computing Vf modulo p 337
  20. Chapter 14. Computing the residual Galois representations 371
  21. Chapter 15. Computing coefficients of modular forms 383
  22. Epilogue 399
  23. Bibliography 403
  24. Index 423
https://doi.org/10.1515/9781400839001.203

Chapters in this book

  1. Frontmatter i
  2. Contents v
  3. Preface ix
  4. Acknowledgments x
  5. Author information xi
  6. Dependencies between the chapters xii
  7. Chapter 1. Introduction, main results, context 1
  8. Chapter 2. Modular curves, modular forms, lattices, Galois representations 29
  9. Chapter 3. First description of the algorithms 69
  10. Chapter 4. Short introduction to heights and Arakelov theory 79
  11. Chapter 5. Computing complex zeros of polynomials and power series 95
  12. Chapter 6. Computations with modular forms and Galois representations 129
  13. Chapter 7. Polynomials for projective representations of level one forms 159
  14. Chapter 8. Description of X1(5l) 173
  15. Chapter 9. Applying Arakelov theory 187
  16. Chapter 10. An upper bound for Green functions on Riemann surfaces 203
  17. Chapter 11. Bounds for Arakelov invariants of modular curves 217
  18. Chapter 12. Approximating Vf over the complex numbers 257
  19. Chapter 13. Computing Vf modulo p 337
  20. Chapter 14. Computing the residual Galois representations 371
  21. Chapter 15. Computing coefficients of modular forms 383
  22. Epilogue 399
  23. Bibliography 403
  24. Index 423
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