广义回避子空间

IF 0.5 4区 数学 Q3 MATHEMATICS
Anina Gruica, Alberto Ravagnani, John Sheekey, Ferdinando Zullo
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引用次数: 0

摘要

我们针对共享一个共同维度的子空间集合,引入并探索了一个新的闪避子空间概念,其中最著名的是部分散布。我们证明,这个概念概括了已知的子空间散布性和规避性概念。我们建立了关于任意部分散布的规避子空间维度的各种上界,并对德萨吉斯的上界进行了改进。我们还利用图论方法,以非构造方式建立了闪避空间的存在性结果。我们得出的上界和下界可以精确地解释为某些组合几何的临界指数。最后,我们研究了我们引入的规避空间概念与秩度量代码理论之间的联系,获得了关于覆盖半径和最小向量秩度量代码存在性的新结果。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Generalised evasive subspaces

We introduce and explore a new concept of evasive subspace with respect to a collection of subspaces sharing a common dimension, most notably partial spreads. We show that this concept generalises known notions of subspace scatteredness and evasiveness. We establish various upper bounds for the dimension of an evasive subspace with respect to arbitrary partial spreads, obtaining improvements for the Desarguesian ones. We also establish existence results for evasive spaces in a nonconstructive way, using a graph theory approach. The upper and lower bounds we derive have a precise interpretation as bounds for the critical exponent of certain combinatorial geometries. Finally, we investigate connections between the notion of evasive space we introduce and the theory of rank-metric codes, obtaining new results on the covering radius and on the existence of minimal vector rank-metric codes.

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来源期刊
CiteScore
1.60
自引率
14.30%
发文量
55
审稿时长
>12 weeks
期刊介绍: The Journal of Combinatorial Designs is an international journal devoted to the timely publication of the most influential papers in the area of combinatorial design theory. All topics in design theory, and in which design theory has important applications, are covered, including: block designs, t-designs, pairwise balanced designs and group divisible designs Latin squares, quasigroups, and related algebras computational methods in design theory construction methods applications in computer science, experimental design theory, and coding theory graph decompositions, factorizations, and design-theoretic techniques in graph theory and extremal combinatorics finite geometry and its relation with design theory. algebraic aspects of design theory. Researchers and scientists can depend on the Journal of Combinatorial Designs for the most recent developments in this rapidly growing field, and to provide a forum for both theoretical research and applications. All papers appearing in the Journal of Combinatorial Designs are carefully peer refereed.
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