2015
DOI: 10.1017/cbo9781316257449
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Finite Geometry and Combinatorial Applications

Abstract: The projective and polar geometries that arise from a vector space over a finite field are particularly useful in the construction of combinatorial objects, such as latin squares, designs, codes and graphs. This book provides an introduction to these geometries and their many applications to other areas of combinatorics. Coverage includes a detailed treatment of the forbidden subgraph problem from a geometrical point of view, and a chapter on maximum distance separable codes, which includes a proof that such c… Show more

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Cited by 43 publications
(80 citation statements)
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“…Our construction makes use of the finite geometry associated with a quadratic form over a finite field, see [4,15] for the general theory behind it. We repeat the relevant facts in the following.…”
Section: Constructionmentioning
confidence: 99%
“…Our construction makes use of the finite geometry associated with a quadratic form over a finite field, see [4,15] for the general theory behind it. We repeat the relevant facts in the following.…”
Section: Constructionmentioning
confidence: 99%
“…(iii) (Penttila and Royle [40]) In PG (2,32), there are exactly six distinct hyperovals. They are the regular hyperoval, the translation hyperoval, the Segre hyperoval, the Payne hyperoval, the Cherowitzo hyperoval and the O'Keefe-Penttila hyperoval.…”
Section: 1mentioning
confidence: 99%
“…Hyperovals only exist if the order is even, and in that case every oval (q + 1-arc) extends uniquely to a hyperoval. (For further details, see [2]. )…”
Section: Case Of Equality With the Theoretical Lower Boundmentioning
confidence: 99%