Cremona, John - Mathematics Institute, University of Warwick

• MODULAR SYMBOLS FOR 1(N) ELLIPTIC CURVES WITH
• MATHEMATICS OF COMPUTATION Volume 00, Number 0, Xxxx XXXX, Pages 000--000
• London Mathematical Society ISSN 1461--1570 MINIMAL MODELS FOR
• J. Symbolic Computation (2000) 11, 1--000 Classical Invariants and 2descent on Elliptic Curves
• Computing in component groups of elliptic curves John Cremona
• The elliptic curve database to 130000 John Cremona
• Computing a Lower Bound for the Canonical Height on Elliptic Curves over Q
• Reduction of binary forms over imaginary quadratic John Cremona
• Finding all elliptic curves with good reduction outside a given set of primes
• Computing modular forms1 over imaginary quadratic fields
• ON A THEOREM OF MESTRE AND SCHOOF JOHN E. CREMONA AND ANDREW V. SUTHERLAND
• On the computation of Mordell-Weil and 2-Selmer Groups of Elliptic Curves
• London Mathematical Society ISSN 14611570 REDUCTION OF BINARY CUBIC AND QUARTIC FORMS
• Higher Descents on Elliptic Curves J. E. Cremona
• ON THE DIOPHANTINE EQUATION x2 SAMIR SIKSEK AND JOHN E. CREMONA
• Height Difference Bounds For Elliptic Curves over Number Fields
• The elliptic curve database to 130000 John Cremona
• Numerical evidence for the BirchSwinnerton-Dyer John Cremona
• UNIMODULAR INTEGER CIRCULANTS J. E. CREMONA
• On the equivalence of binary quartics J. E. Cremona
• COMPUTING IN COMPONENT GROUPS OF ELLIPTIC J. E. CREMONA
• The elliptic curve database for conductors to John Cremona
• Journal de Theorie des Nombres de Bordeaux 00 (XXXX), 000000
• ON THE REDUCTION THEORY OF BINARY FORMS MICHAEL STOLL AND JOHN E. CREMONA
• MODULAR SYMBOLS AND THE COMPUTATION OF MODULAR ELLIPTIC CURVES
• ON THE DIOPHANTINE EQUATION x 2 + 7 = y m SAMIR SIKSEK AND JOHN E. CREMONA
• Advanced Topics in Computational Number Theory Henri Cohen
• Advanced Topics in Computational Number Theory Henri Cohen
• Visualizing elements in the ShafarevichTate group J. E. Cremona and B. Mazur
• Finding all elliptic curves with good reduction outside a given set of primes
• 0 Classical Invariant Theory
• Higher Descents on Elliptic Curves J. E. Cremona
• The Arithmetic of Elliptic Curves Theory Conjectures
• J. Symbolic Computation (2000) 11, 1-000 Classical Invariants and 2-descent on Elliptic Curves
• MODULAR SYMBOLS AND THE COMPUTATION OF MODULAR ELLIPTIC CURVES
• Modular Forms and Elliptic Curves over Imaginary Quadratic Fields
• ON THE REDUCTION THEORY OF BINARY FORMS MICHAEL STOLL AND JOHN E. CREMONA
• On the computation of MordellWeil and 2Selmer Groups of Elliptic Curves
• London Mathematical Society ISSN 14611570 MINIMAL MODELS FOR
• MATHEMATICS OF COMPUTATION Volume 00, Number 0, Xxxx XXXX, Pages 000-000
• Visualizing elements in the Shafarevich-Tate group J. E. Cremona and B. Mazur
• Modular Forms and Elliptic Curves over Imaginary Quadratic Fields
• The Arithmetic of Elliptic Curves Theory Conjectures
• Reduction of binary forms John Cremona
• COMPUTING THE RANK OF ELLIPTIC CURVES OVER REAL QUADRATIC NUMBER FIELDS OF CLASS NUMBER 1