Hemisystems of the Hermitian Surface

Abstract

We present a new method for the study of hemisystems of the Hermitian surface U3 of PG(3,q2). The basic idea is to represent generator-sets of U3 by means of a maximal curve naturally embedded in U3 so that a sufficient condition for the existence of hemisystems may follow from results about maximal curves and their automorphism groups. In this paper we obtain a hemisystem in \ PG(3,p2) for each p prime of the form p=1+16n2 with an integer n. Since the famous Landau's conjecture dating back to 1904 is still to be proved (or disproved), it is unknown whether there exists an infinite sequence of such primes. What is known so far is that just 18 primes up to 51000 with this property exist, namely 17,257,401,577, 1297,1601, 3137, 7057,13457,14401,15377,24337,25601,30977, 32401,33857,41617,50177. The scarcity of such primes seems to confirm that hemisystems of U3 are rare objects.