On the Convex Hull of the Points on Modular Hyperbolas

Abstract

Given integers a and m 2, let be the following set of integral points = \(x,y) \ : \ xy a m,\ 1 x,y m-1\ We improve several previously known upper bounds on va(m), the number of vertices of the convex closure of , and show that uniformly over all a with (a,m)=1 we have va(m) m1/2 + o(1) and furthermore, we have va(m) m5/12 + o(1) for m which are almost squarefree.