On the Generation of Some Embeddable GF(2) Geometries |
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| Authors: | BN Cooperstein |
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| Institution: | (1) Department of Mathematics, University of California, Santa Cruz, USA |
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| Abstract: | The generating rank is determined for several GF(2)-embeddable geometries and it is demonstrated that their generating and embedding ranks are equal. Specifically, we prove that each of the two generalized hexagons of order (2, 2) has generating rank 14, that the central involution geometry of the Hall-Janko sporadic group has generating rank 28, and that the dual polar space DU(6,2) has generating rank 22. We also include a survey of all instances in which either the generating or embedding rank of an embeddable GF(2) geometry is known. |
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| Keywords: | point-line geometry embeddable geometry embedding rank generating rank |
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