Segre's theorem on asymmetric diophantine approximation

We investigate rational approximations ðr=p; q=pÞ or ðr=p; q=rÞ to points on the curve ða; a t Þ for almost all a > 0; where p; q; r are all primes. We immediately obtain corollaries on making p; ½ap; ½a t p simultaneously prime. # 2002 Elsevier Science (USA)

A new approach to inhomogeneous Diophantine approximation is given and a method for the computation of inhomogeneous minima of binary quadratic forms is derived. The new method is simpler than earlier ones of Barnes and SwinnertonDyer. As an application, a new proof of a theorem of Davenport, which

A modification of the Ford geometric approach to the problem of approximation of complex numbers by elements of an imaginary quadratic number field is developed. An upper bound for the Hurwitz constant for the field is obtained in terms of the geometry of the isometric fundamental domain for the cor

Let (r), r=1, 2, ... be a positive decreasing sequence such that r=1 (r) k diverges. Using a powerful variance argument due to Schmidt, an asymptotic formula is obtained for the number of integer solutions q of the system of Diophantine inequalities max[&qx i &: which holds for almost all points (x