On sets of type $(m,h)_2$ in $PG(3,q)$ with $m\leq q$
DOI:
https://doi.org/10.1285/i15900932v35n1p109Keywords:
projective space, linear code, intersection number, linear spaceAbstract
A set of points of $PG(3, q)$ of type $(m, h)_2$, with $m\le q$, has size $k\ge m(q+1)$. In this paper, some characterization results of some sets of type $(m,h)_2$, $3\le m\le q$, of minimal size $m(q+1)$ are given. Finally, sets of type $(3, h)_2$ in $PG(3, q)$ are studied.Downloads
Published
23-03-2016
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