Abstract
We consider resolutions of projective geometries over finite fields. A resolution is a set partition of the set of lines such that each part, which is called resolution class, is a set partition of the set of points. If a resolution has a cyclic automorphism of full length the resolution is said to be point-cyclic. The projective geometry and are known to be point-cyclically resolvable. We describe an algorithm to construct such point-cyclic resolutions and show that has also a point-cyclic resolution.
Citation
Michael Braun. "Construction of a point-cyclic resolution in $\mathrm{PG}(9,2)$." Innov. Incidence Geom. 3 33 - 50, 2006. https://doi.org/10.2140/iig.2006.3.33
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