Regular sets of lines in rank 3 polar spaces
Abstract
There are 6 families of finite polar spaces of rank 3. The set of lines in a rank 3 polar space form a rank 5 association scheme. We determine the regular sets of minimal size in several of these polar spaces, and describe some examples. We also give a new family of Cameron--Liebler sets of generators in the polar spaces O+(10,q) when q = 3h using a regular set of lines in O(7,q).
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