Improved upper bounds for partial spreads
Abstract
A partial (k-1)-spread in PG(n-1,q) is a collection of (k-1)-dimensional subspaces with trivial intersection, i.e., each point is covered at most once. So far the maximum size of a partial (k-1)-spread in PG(n-1,q) was known for the cases n 0 k, n 1 k and n 2 k with the additional requirements q=2 and k=3. We completely resolve the case n 2 k for the binary case q=2.
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