A Classification of Hyperfocused 12-Arcs
Abstract
A k-arc in PG(2,q) is a set of k points no three of which are collinear. A hyperfocused k-arc is a k-arc in which the k 2 secants meet some external line in exactly k-1 points. Hyperfocused k-arcs can be viewed as 1-factorizations of the complete graph Kk that embed in PG(2,q). We study the 526,915,620 1-factorizations of K12, determine which are embeddable in PG(2,q), and classify hyperfocused 12-arcs. Specifically we show if a 12-arc K is a hyperfocused arc in PG(2,q) then q = 25k and K is a subset of a hyperconic including the nucleus.
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