Lines, Circles, Planes and Spheres

Abstract

Let S be a set of n points in R3, no three collinear and not all coplanar. If at most n-k are coplanar and n is sufficiently large, the total number of planes determined is at least 1 + k n-k2-k2(n-k2). For similar conditions and sufficiently large n, (inspired by the work of P. D. T. A. Elliott in Ell67) we also show that the number of spheres determined by n points is at least 1+n-13-t3orchard(n-1), and this bound is best possible under its hypothesis. (By t3orchard(n), we are denoting the maximum number of three-point lines attainable by a configuration of n points, no four collinear, in the plane, i.e., the classic Orchard Problem.) New lower bounds are also given for both lines and circles.