Small complete caps in PG(4n + 1, q)
Abstract
In this paper we prove the existence of a complete cap of PG(4n+1, q) of size 2(q2n+1-1)/(q-1), for each prime power q>2. It is obtained by projecting two disjoint Veronese varieties of PG(2n2+3n, q) from a suitable (2n2-n-2)-dimensional projective space. This shows that the trivial lower bound for the size of the smallest complete cap of PG(4n+1, q) is essentially sharp.
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