A proof of the linearity conjecture for k-blocking sets in PG(n, p), p prime
نویسنده
چکیده
In this paper, we show that a small minimal k-blocking set in PG(n, q), q = p, h ≥ 1, p prime, p ≥ 7, intersecting every (n−k)-space in 1 (mod q) points, is linear. As a corollary, this result shows that all small minimal k-blocking sets in PG(n, p), p prime, p ≥ 7, are Fp-linear, proving the linearity conjecture (see [7]) in the case PG(n, p), p prime, p ≥ 7.
منابع مشابه
A proof of the linearity conjecture for k-blocking sets in PG(n, p3), p prime
In this paper, we show that a small minimal k-blocking set in PG(n, q), q = p, h ≥ 1, p prime, p ≥ 7, intersecting every (n−k)-space in 1 (mod q) points, is linear. As a corollary, this result shows that all small minimal k-blocking sets in PG(n, p), p prime, p ≥ 7, are Fp-linear, proving the linearity conjecture (see [7]) in the case PG(n, p), p prime, p ≥ 7.
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تاریخ انتشار 2009