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Published online by Cambridge University Press: 07 September 2010
Abstract
A generalized Fischer space is a partial linear space in which any two intersecting lines generate a subspace isomorphic to an affine plane or the dual of an affine plane. We give a classification of all finite and infinite generalized Fischer spaces under some nondegeneracy conditions.
Introduction
Let Π = (P, L) be a partial linear space, that is a set of points P together with a set L of subsets of P of cardinality at least 2 called lines, such that each pair of points is in at most one line. A subset X of P is called a subspace of Π if it has the property that any line meeting X in at least two points is contained in X. A subspace X together with the lines contained in it is a partial linear space. Subspaces are usualy identified with these partial linear spaces. As the intersection of any collection of subspaces is again a subspace, we can define for each subset X of P the subspace generated by X to be the smallest subspace containing X. This subspace will be denoted by 〈X〉. A plane is a subspace generated by two intersecting lines.
In [3], [6] partial linear spaces are considered in which all planes are either isomorphic to an affine plane or the dual of an affine plane. Such spaces are called generalized Fischer spaces.
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