A linear partial spread is a set of mutually skew lines of some P (V) , where V is a finite-dimensional vector space over a field, that are characterized by the property that their images under the Plücker embedding are in a given subspace of P ( ⋀2 V) ; it is a linear spread if the lines in it cover the whole space. We will provide methods to construct linear partial spreads, and characterize some of the linear partial spreads built in this way by means of transversal lines.
On linear partial spreads
ZANELLA, CORRADO
2012
Abstract
A linear partial spread is a set of mutually skew lines of some P (V) , where V is a finite-dimensional vector space over a field, that are characterized by the property that their images under the Plücker embedding are in a given subspace of P ( ⋀2 V) ; it is a linear spread if the lines in it cover the whole space. We will provide methods to construct linear partial spreads, and characterize some of the linear partial spreads built in this way by means of transversal lines.File in questo prodotto:
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