A Completion Result for Partial Affine and Inversive Spaces

Abstract

A partial affine plane of order n is a point-line incidence structure with n2 points and n points on each line, such that every two lines meet in at most one point. In this paper, we show that a partial affine plane of order n, n sufficiently large, in which parallelism is an equivalence relation, containing more than n2-n lines, can be completed to an affine plane, thus improving the 40-year old bound of [S. Dow. A completion problem for finite affine planes. Combinatorica, 6:321--325, 1986.] Furthermore, we derive a higher-dimensional result about the completion of 2-(nd,n,1)-designs, as well as for partial inversive spaces. In particular, we show that a partial 3-(n2+1,n+1,1)-design for which in every derived structure, parallelism is an equivalence relation, and there are at least n2+n-n lines, can be completed to an inversive plane.