On Bruen chains
Abstract
It is known that a Bruen chain of the three-dimensional projective space PG(3,q) exists for every odd prime power q at most 37, except for q=29. It was shown by Cardinali et. al (2005) that Bruen chains do not exist for 41 q≤ 49. We develop a model, based on finite fields, which allows us to extend this result to 41≤slant q ≤slant 97, thereby adding more evidence to the conjecture that Bruen chains do not exist for q>37. Furthermore, we show that Bruen chains can be realised precisely as the (q+1)/2-cliques of a two related, yet distinct, undirected simple graphs.
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