A note on Cameron - Liebler line classes in PG(n,4)
Abstract
A Cameron -- Liebler line class L with parameter x is a set of lines of projective geometry PG(3,q) such that each line of L meets exactly x(q+1)+q2-1 lines of L and each line that is not from L meets exactly x(q+1) lines of L. In this paper, we obtain a classification of Cameron -- Liebler line classes in PG(3,4) and a classification of their generalization in PG(n,4), n≥slant 4.
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