Embedded polar spaces revisited
Abstract
In this paper we introduce generalized pseudo-quadratic forms and develope some theory for them. Recall that the codomain of a -quadratic form is the group , where is the underlying division ring of the vector space on which the form is defined and . Generalized pseudo-quadratic forms are defined in the same way as -quadratic forms but for replacing with a quotient for a subgroup of such that for any . In particular, every non-trivial generalized pseudo-quadratic form admits a unique sesquilinearization, characterized by the same property as the sesquilinearization of a pseudo-quadratic form. Moreover, if is a non-trivial generalized pseudo-quadratic form and is its sesquilinarization, the points and the lines of where vanishes form a subspace of the polar space associated to . After a discussion of quotients and covers of generalized pseudo-quadratic forms we prove the following: let be a projective embedding of a non-degenerate polar space of rank at least ; then is either the polar space associated to a generalized pseudo-quadratic form or the polar space associated to an alternating form . By exploiting this theorem we also obtain an elementary proof of the following well known fact: an embedding as above is dominant if and only if either for a pseudo-quadratic form or and for an alternating form .
Keywords
Cite
@article{arxiv.1403.5954,
title = {Embedded polar spaces revisited},
author = {Antonio Pasini},
journal= {arXiv preprint arXiv:1403.5954},
year = {2014}
}
Comments
28 pages