Distances to the two and three furthest points

Let 1 = d~ <d2 < ... <dk denote the distinct distances determined by a set of n points in the plane. The multiplicity of the two smallest distances is smaller than 6n and it is maximized by the triangular lattice, where d2 --x/~. We partially answer a question of Erd6s and Vesztergombi by proving th

new method is developed for the study of tit-order electrode reactions. It involves current measurements at just two selected potentials, and yields accurate values for the transfer coefficient and the exchange cd. It has application to many monoelectrodes and corroding electrodes. The method is app

We prove diophantine inequalities involving various distances between two distinct algebraic points of an algebraic curve. These estimates may be viewed as extensions of classical Liouville's inequality. Our approach is based on a transcendental construction using algebraic functions. Next we apply

Let x be a real number in [0, 1], F n be the Farey sequence of order n and \ n (x) be the distance between x and F n . Assuming that n Ä we derive the asymptotic distributions of the functions n 2 \ n (x) and n\ n (x$Ân), 0 x$ n. We also establish the asymptotics for 1 0 \ $ n (x) dx, for all real $