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A non-existence result on Cameron–Liebler line classes

✍ Scribed by J. De Beule; A. Hallez; L. Storme

Publisher
John Wiley and Sons
Year
2008
Tongue
English
Weight
112 KB
Volume
16
Category
Article
ISSN
1063-8539

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✦ Synopsis

Abstract

Cameron–Liebler line classes are sets of lines in PG(3, q) that contain a fixed number x of lines of every spread. Cameron and Liebler classified Cameron–Liebler line classes for x ∈ {0, 1, 2, q^2^ − 1, q^2^, q^2^ + 1} and conjectured that no others exist. This conjecture was disproven by Drudge for q = 3 [8] and his counterexample was generalized to a counterexample for any odd q by Bruen and Drudge [4]. A counterexample for q even was found by Govaerts and Penttila [9]. Non‐existence results on Cameron–Liebler line classes were found for different values of x. In this article, we improve the non‐existence results on Cameron–Liebler line classes of Govaerts and Storme [11], for q not a prime. We prove the non‐existence of Cameron–Liebler line classes for 3 ≤ x < q/2. © 2007 Wiley Periodicals, Inc. J Combin Designs 16: 342–349, 2008

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