Embeddings of Line-grassmannians of Polar Spaces in Grassmann Varieties

Abstract

An embedding of a point-line geometry is usually defined as an injective mapping ε from the point-set of to the set of points of a projective space such that ε(l) is a projective line for every line l of , but different situations have lately been considered in the literature, where ε(l) is allowed to be a subline of a projective line or a curve. In this paper we propose a more general definition of embedding which includes all the above situations and we focus on a class of embeddings, which we call Grassmman embeddings, where the points of are firstly associated to lines of a projective geometry PG(V), next they are mapped onto points of PG(V V) via the usual projective embedding of the line-grassmannian of PG(V) in PG(V V). In the central part of our paper we study sets of points of PG(V V) corresponding to lines of PG(V) totally singular for a given pseudoquadratic form of V. Finally, we apply the results obtained in that part to the investigation of Grassmann embeddings of several generalized quadrangles.