Given a field K of characteristic 2 and an integer n >= 2, let W(2n-1, K) be the symplectic polar space defined in PG(2n-1, K) by a non-degenerate alternating form of V(2n, K) and let Q(2n, K) be the quadric of PG(2n, K) associated to a non-singular quadratic form of Witt index n. In the literature it is often claimed that W(2n-1, K) congruent to Q(2n, K). This is true when K is perfect, but false otherwise. In this article, we modify the previous claim in order to obtain a statement that is correct for any field of characteristic 2. Explicitly, we prove that W(2n-1, K) is indeed isomorphic to a non-singular quadric Q, but when K is non-perfect the nucleus of Q has vector dimension greater than 1. So, in this case, Q(2n, K) is a proper subgeometry of W(2n-1, K). We show that, in spite of this fact, W(2n-1, K) can be embedded in Q(2n, K) as a subgeometry and that this embedding induces a full embedding of the dual DW(2n-1, K) of W(2n-1, K) into the dual DQ(2n, K) of Q(2n, K).
DE BRUYN, B., Pasini, A. (2009). On symplectic polar spaces over non-perfect fields of characteristic 2. LINEAR & MULTILINEAR ALGEBRA, 57(6), 567-575 [10.1080/03081080802012623].
On symplectic polar spaces over non-perfect fields of characteristic 2
PASINI A.
2009-01-01
Abstract
Given a field K of characteristic 2 and an integer n >= 2, let W(2n-1, K) be the symplectic polar space defined in PG(2n-1, K) by a non-degenerate alternating form of V(2n, K) and let Q(2n, K) be the quadric of PG(2n, K) associated to a non-singular quadratic form of Witt index n. In the literature it is often claimed that W(2n-1, K) congruent to Q(2n, K). This is true when K is perfect, but false otherwise. In this article, we modify the previous claim in order to obtain a statement that is correct for any field of characteristic 2. Explicitly, we prove that W(2n-1, K) is indeed isomorphic to a non-singular quadric Q, but when K is non-perfect the nucleus of Q has vector dimension greater than 1. So, in this case, Q(2n, K) is a proper subgeometry of W(2n-1, K). We show that, in spite of this fact, W(2n-1, K) can be embedded in Q(2n, K) as a subgeometry and that this embedding induces a full embedding of the dual DW(2n-1, K) of W(2n-1, K) into the dual DQ(2n, K) of Q(2n, K).File | Dimensione | Formato | |
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https://hdl.handle.net/11365/7328
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