Maximal line-free sets in Fpn

Abstract

We study subsets of Fpn that do not contain progressions of length k. We denote by rk(Fpn) the cardinality of such subsets containing a maximal number of elements. In this paper we focus on the case k=p and therefore sets containing no full line. A~trivial lower bound rp(Fpn)≥(p-1)n is achieved by a hypercube of side length p-1 and it is known that equality holds for n∈\1,2\. We will however show that rp(Fp3)≥ (p-1)3+p-2p, which is the first improvement in the three dimensional case that is increasing in p. We will also give the upper bound rp(Fp3)≤ p3-2p2-(2-1)p+2 as well as generalizations for higher dimensions. Finally we present some bounds for individual p and n, in particular r5(F53)≥ 70 and r7(F73)≥ 225 which can be used to give the asymptotic lower bound 4.121n for r5(F5n) and 6.082n for r7(F7n).

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