Generalizing Korchm\'aros--Mazzocca arcs

Abstract

In this paper, we generalize the so called Korchm\'aros--Mazzocca arcs, that is, point sets of size q+t intersecting each line in 0, 2 or t points in a finite projective plane of order q. For t≠ 2, this means that each point of the point set is incident with exactly one line meeting the point set in t points. In PG(2,pn), we change 2 in the definition above to any integer m and describe all examples when m or t is not divisible by p. We also study mod p variants of these objects, give examples and under some conditions we prove the existence of a nucleus.