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- Title Pages
- Let τ:ℕ→ℤ be defined by
- Contents
- Preface
- Acknowledgments
- Author information
- Dependencies between the chapters
- Chapter One Introduction, main results, context
- Chapter Two Modular curves, modular forms, lattices, Galois representations
- Chapter Three First description of the algorithms
- Chapter Four Short introduction to heights and Arakelov theory
- Chapter Five Computing complex zeros of polynomials and power series
- Chapter Six Computations with modular forms and Galois representations
- Chapter Seven Polynomials for projective representations of level one forms
- Chapter Eight Description of X1(5l)
- Chapter Nine Applying Arakelov theory
- Chapter Ten An upper bound for Green functions on Riemann surfaces
- Chapter Eleven Bounds for Arakelov invariants of modular curves
- Chapter Twelve Approximating Vf over the complex numbers
- Chapter Thirteen Computing Vf modulo p
- Chapter Fourteen Computing the residual Galois representations
- Chapter Fifteen Computing coefficients of modular forms
- Epilogue
- Bibliography
- Index

# (p.xii) Dependencies between the chapters

# (p.xii) Dependencies between the chapters

- Source:
- Computational Aspects of Modular Forms and Galois Representations
- Author(s):
- Bas Edixhoven, Jean-Marc Couveignes
- Publisher:
- Princeton University Press

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- Title Pages
- Let τ:ℕ→ℤ be defined by
- Contents
- Preface
- Acknowledgments
- Author information
- Dependencies between the chapters
- Chapter One Introduction, main results, context
- Chapter Two Modular curves, modular forms, lattices, Galois representations
- Chapter Three First description of the algorithms
- Chapter Four Short introduction to heights and Arakelov theory
- Chapter Five Computing complex zeros of polynomials and power series
- Chapter Six Computations with modular forms and Galois representations
- Chapter Seven Polynomials for projective representations of level one forms
- Chapter Eight Description of X1(5l)
- Chapter Nine Applying Arakelov theory
- Chapter Ten An upper bound for Green functions on Riemann surfaces
- Chapter Eleven Bounds for Arakelov invariants of modular curves
- Chapter Twelve Approximating Vf over the complex numbers
- Chapter Thirteen Computing Vf modulo p
- Chapter Fourteen Computing the residual Galois representations
- Chapter Fifteen Computing coefficients of modular forms
- Epilogue
- Bibliography
- Index