Nearly all subspaces of a classical polar space arise from its universal embedding
Abstract
Let be an embeddable non-degenerate polar space of finite rank n ≥ 2. Assuming that admits the universal embedding (which is true for all embeddable polar spaces except grids of order at least 5 and certain generalized quadrangles defined over quaternion division rings), let :(V) be the universal embedding of . Let S be a subspace of and suppose that S, regarded as a polar space, has non-degenerate rank at least 2. We shall prove that S is the -preimage of a projective subspace of PG(V).
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