Existence of primitive divisors of Lucas and Lehmer numbers Y Bilu, G Hanrot, PM Voutier Walter de Gruyter GmbH & Co. KG 2001 (539), 75-122, 2001 | 607 | 2001 |
An effective lower bound for the height of algebraic numbers P Voutier Acta Arithmetica 74, 81-95, 1996 | 208* | 1996 |
Primitive divisors of Lucas and Lehmer sequences PM Voutier Mathematics of Computation 64 (210), 869-888, 1995 | 169 | 1995 |
Complete solution of the diophantine equation and a related family of quartic Thue equations CJ Hua, P Voutier Journal of Number Theory 62, 71-99, 1997 | 96 | 1997 |
Simple families of Thue inequalities G Lettl, A Pethő, P Voutier Transactions of the American Mathematical Society 351 (5), 1871-1894, 1999 | 75 | 1999 |
An Upper Bound for the Size of Integral Solutions to Y^m=ƒ(X) PM Voutier Journal of Number Theory 53 (2), 247-271, 1995 | 58 | 1995 |
Solving a family of Thue equations with an application to the equation x^ 2-Dy^ 4= 1 A Togbe, PM Voutier, PG Walsh Acta Arithmetica 120 (1), 39-58, 2005 | 55 | 2005 |
A kit for linear forms in three logarithms M Mignotte, P Voutier Mathematics of Computation, 2023 | 36 | 2023 |
Primitive divisors of Lucas and Lehmer sequences, III PM Voutier Mathematical Proceedings of the Cambridge Philosophical Society 123 (3), 407-419, 1998 | 26 | 1998 |
On the arithmetic of simplest sextic fields and related Thue equations G Lettl, A Petho, P Voutier Number theory (Eger, 1996), 331-348, 1998 | 22 | 1998 |
Primitive divisors of Lucas and Lehmer sequences, II PM Voutier Journal de théorie des nombres de Bordeaux 8 (2), 251-274, 1996 | 22 | 1996 |
Primitive divisors of certain elliptic divisibility sequences P Voutier, M Yabuta Acta Arithmetica 151, 165-190, 2012 | 16 | 2012 |
Rational approximations to $\sqrt[3]{2}$ and other algebraic numbers revisited P Voutier Journal de théorie des nombres de Bordeaux 19 (1), 263-288, 2007 | 16 | 2007 |
Thue's fundamentaltheorem, I: the general case P Voutier Acta Arithmetica 143, 101-144, 2010 | 14 | 2010 |
LANG'S CONJECTURE AND SHARP HEIGHT ESTIMATES FOR THE ELLIPTIC CURVES y2 = x3 + ax P Voutier, M Yabuta International Journal of Number Theory 9 (05), 1141-1170, 2013 | 13 | 2013 |
Indecomposable integers in real quadratic fields M Tinková, P Voutier Journal of Number Theory 212, 458-482, 2020 | 11 | 2020 |
Lang's conjecture and sharp height estimates for the elliptic curves y^2= x^3+ ax P Voutier, M Yabuta International Journal of Number Theory 9 (5), 1141-1170, 2013 | 11 | 2013 |
Complete solution of the Diophantine equation x2+ 1= dy4 and related family of quartic Thue equations [J] C Jianhua, P Voutier J. Number Theory 62, 71-99, 1997 | 10 | 1997 |
A further note on “On the equation ” PM Voutier Acta Arithmetica 137, 203-206, 2009 | 9 | 2009 |
Families of periodic Jacobi–Perron algorithms for all period lengths P Voutier Journal of Number Theory 168, 472-486, 2016 | 8 | 2016 |