On q-covering designs
Abstract
A q-covering design Cq(n, k, r), k r, is a collection X of (k-1)-spaces of PG(n-1, q) such that every (r-1)-space of PG(n-1, q) is contained in at least one element of X . Let Cq(n, k, r) denote the minimum number of (k-1)-spaces in a q-covering design Cq(n, k, r). In this paper improved upper bounds on Cq(2n, 3, 2), n 4, Cq(3n + 8, 4, 2), n 0, and Cq(2n,4,3), n 4, are presented. The results are achieved by constructing the related q-covering designs.
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