Minihypers and Linear Codes Meeting the Griesmer Bound: Improvements to Results of Hamada, Helleseth and Maekawa期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

Minihypers and Linear Codes Meeting the Griesmer Bound: Improvements to Results of Hamada, Helleseth and Maekawa

Authors:	S. Ferret L. Storme

Affiliation:	(1) Dept. of Pure Maths and Computer Algebra, Ghent University, Krijgslaan 281, 9000 Ghent, Belgium

Abstract:	This article improves results of Hamada, Helleseth and Maekawa on minihypers in projective spaces and linear codes meeting the Griesmer bound.In [10,12],it was shown that any $left{ {sumnolimits_{i = 0}^{t - 1} {{varepsilon }_i {upsilon }_{i + 1} ,sumnolimits_{i = 0}^{t - 1} {{varepsilon }_i {upsilon }_i ;t,q} } } right}$ -minihyper, with $sumnolimits_{i = 0}^{t - 1} {{varepsilon }_i = h}$ , where $left( {h - 1} right)^2 < q$ , is the disjoint union of ${{varepsilon }_0 }$ points, ${{varepsilon }_1 }$ lines,..., ${varepsilon }_{t - 1} left( {t - 1} right)$ -dimensional subspaces. For q large, we improve on this result by increasing the upper bound on $h:left( 1 right){text{ for }}q = p^f ,p{text{ prime, }}p > 3,{text{ }}q$ non-square, to $h leqslant q^{6/9} /left( {1 + q^{1/9} } right),left( 2 right){text{ for }}q = p^f$ non-square, $p = 2,3,{text{ to }}h leqslant 2^{ - 1/3} q^{5/9} ,left( 3 right){text{ for }}q = p^f$ square, $p = 2,3,{text{ to }}h leqslant {text{ min }}left{ {2sqrt q - 1,2^{ - 1/3} q^{5/9} } right}$ , and (4) for square, p prime, p<3, to $h leqslant {text{ min }}left{ {2sqrt q - 1,q^{6/9} /left( {1 + q^{1/9} } right)} right}$ . In the case q non-square, the conclusion is the same as written above; the minihyper is the disjoint union of subspaces. When q is square however, the minihyper is either the disjoint union of subspaces, or the disjoint union of subspaces and one subgeometry . For the coding-theoretical problem, our results classify the corresponding $left[ {n = {upsilon }_{t + 1} - sumnolimits_{i = 0}^{t - 1} {{varepsilon }_i {upsilon }_{i + 1} ,k = t + 1,d = q^t - } sumnolimits_{i = 0}^{t - 1} {q^i {varepsilon }_i ;q} } right]$ codes meeting the Griesmer bound.

Keywords:	minihypers linear codes projective spaces Griesmer bound
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