Abstract
The basic idea is a mapping from d-dimensional subspaces of a 2d-dimensional vector space onto points in a projective space of dimension \(\left( \begin{gathered} 2d \hfill \\ d \hfill \\ \end{gathered} \right) - 1\). We develop conditions under which a point in the larger projective space is an image point under this mapping. We also develop conditions corresponding to cases where the d-dimensional vector spaces do or do not intersect.
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