- DESCENT ON PICARD GROUPS USING FUNCTIONS ON SAMIR SIKSEK
- ON THE DIOPHANTINE EQUATION x2 F. S. ABU MURIEFAH, F. LUCA, S. SIKSEK, SZ. TENGELY
- Samir Siksek List of Publications All my publications are available from
- Proceedings of the Edinburgh Mathematical Society (2010) 53, 747763 c DOI:10.1017/S0013091508000874 Printed in the United Kingdom
- CHABAUTY FOR SYMMETRIC POWERS OF CURVES SAMIR SIKSEK
- Journal de Theorie des Nombres de Bordeaux 00 (XXXX), 000000
- A MULTI-FREY APPROACH TO SOME MULTI-PARAMETER FAMILIES OF DIOPHANTINE EQUATIONS
- FIBONACCI NUMBERS AT MOST ONE AWAY FROM A PERFECT POWER
- ON FIBONACCI NUMBERS WITH FEW PRIME DIVISORS YANN BUGEAUD, FLORIAN LUCA, MAURICE MIGNOTTE, SAMIR SIKSEK
- ON HAPPY NUMBERS ESAM EL-SEDY AND SAMIR SIKSEK
- THE HEIGHT PAIRING ON ELLIPTIC CURVES WITH COMPLEX MULTIPLICATION
- EXPLICIT 4-DESCENTS ON AN ELLIPTIC CURVE J.R. MERRIMAN, S. SIKSEK, AND N.P. SMART
- INFINITE DESCENT ON ELLIPTIC CURVES SAMIR SIKSEK
- k (Ll-\.~~ ~JJ &-= [K ~ cQ]
- Monday, Lecture 2, Ronald van Luijk, rmluijk@gmail.com Please let us know about mistakes in these notes!
- Counterexamples to the Hasse principle Martin Bright
- Central simple algebras and Brauer groups Damiano Testa
- VISIBILITY OF TATE-SHAFAREVICH GROUPS Abstract. These are the notes for a short course given at the
- ON THE DIOPHANTINE EQUATION x2 SAMIR SIKSEK AND JOHN E. CREMONA
- Graphs of exceptional curves and their automorphism groups; the Segre-Manin Theorem for del Pezzo surfaces I
- DIOPHANTINE EQUATIONS AFTER FERMAT'S LAST THEOREM
- Introduction Galois theory
- Bull. London Math. Soc. 35 (2003) 409414 Cf2003 London Mathematical Society DOI: 10.1112/S0024609302001893
- THE MODULAR APPROACH TO DIOPHANTINE EQUATIONS SAMIR SIKSEK
- Journal de Theorie des Nombres de Bordeaux 00 (XXXX), 000000
- EXPLICIT CHABAUTY OVER NUMBER FIELDS SAMIR SIKSEK
- Mathematics Research Centre For further information on these and other events see: www2.warwick.ac.uk/fac/sci/maths/research/events/2007_2008/
- PERFECT POWERS FROM PRODUCTS OF TERMS IN LUCAS SEQUENCES
- Classification and the Minimal Model Program; the Hodge Damiano Testa
- ON FACTORIALS EXPRESSIBLE AS SUMS OF AT MOST THREE FIBONACCI NUMBERS
- Descents on Curves of Genus 1 Samir Siksek
- C. R. Acad. Sci. Paris, Ser. I 339 (2004) 327330 Thorie des nombres
- Height Difference Bounds For Elliptic Curves over Number Fields
- Mathematics Research Centre For further information on these and other events see: www2.warwick.ac.uk/fac/sci/maths/research/events/2007_2008/
- CLASSICAL AND MODULAR APPROACHES TO EXPONENTIAL DIOPHANTINE EQUATIONS
- THE HEIGHT PAIRING ON ELLIPTIC CURVES WITH COMPLEX MULTIPLICATION
- MATHEMATICS OF COMPUTATION Volume 70, Number 236, Pages 1661-1674
- PERFECT POWERS FROM PRODUCTS OF TERMS IN LUCAS SEQUENCES
- Efficient computation of the Hasse-Weil zeta function
- The BrauerManin obstruction Martin Bright
- EXPLICIT 4-DESCENTS ON AN ELLIPTIC CURVE J.R. MERRIMAN, S. SIKSEK, AND N.P. SMART
- DESCENT ON PICARD GROUPS USING FUNCTIONS ON CURVES
- ON FIBONACCI NUMBERS WITH FEW PRIME DIVISORS YANN BUGEAUD, FLORIAN LUCA, MAURICE MIGNOTTE, SAMIR SIKSEK
- INFINITE DESCENT ON ELLIPTIC CURVES SAMIR SIKSEK
- Descents on Curves of Genus 1 Samir Siksek
- Height Difference Bounds For Elliptic Curves over Number Fields
- ON HAPPY NUMBERS ESAM EL-SEDY AND SAMIR SIKSEK
- MATHEMATICS OF COMPUTATION S 0025-5718(04)01690-4
- The Picard group Martin Bright
- Tuesday, Lecture 2, Ronald van Luijk, rmluijk@gmail.com Please let us know about mistakes in these notes!
- FUNCTIONS, RECIPROCITY AND THE OBSTRUCTION TO DIVISORS ON CURVES
- ON THE DIOPHANTINE EQUATION x2 + 7 = ym SAMIR SIKSEK AND JOHN E. CREMONA
- FIBONACCI NUMBERS AT MOST ONE AWAY FROM A PERFECT POWER
- Journal de Th'eorie des Nombres de Bordeaux 15 (2003), 1-
- Journal de Th'eorie des Nombres de Bordeaux 00 (XXXX), 000-000
