On hyperbolic sets of maxes in dual polar spaces
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- 作者:Bart De Bruyn
- 关键词:Dual polar space ; Hyperbolic set of maxes ; (Classical) Hyperplane ; Universal embedding ; Generalized quadrangle
- 刊名:Discrete Mathematics
- 出版年:28 March, 2014
- 年:2014
- 卷:319
- 期:Complete
- 页码:33-39
- 全文大小:389 K
文摘
Suppose is a fully embeddable thick dual polar space of rank . It is known that a hyperplane of is classical if all its nontrivial intersections with quads are classical. In order to conclude that a hyperplane is classical, it is perhaps not necessary to require in advance that all these intersections are classical. In fact, in this paper we show that for dual polar spaces admitting hyperbolic sets of maxes, the existence of certain classical quad-hyperplane intersections implies that other quad-hyperplane intersections need to be classical as well. We will also derive necessary and sufficient conditions for two disjoint maxes to be contained in a (necessarily unique) hyperbolic set of maxes. Dual polar spaces admitting hyperbolic sets of maxes include all members of a class of embeddable dual polar spaces related to quadratic alternative division algebras.