{"title":"论 $${{\\,\\mathrm\\{textrm{PG}}\\,}}(n,q)$$ 中卡梅隆-利勃勒 k 集的两个不存在结果","authors":"Jan De Beule, Jonathan Mannaert, Leo Storme","doi":"10.1007/s10623-024-01505-8","DOIUrl":null,"url":null,"abstract":"<p>This paper focuses on non-existence results for Cameron–Liebler <i>k</i>-sets. A Cameron–Liebler <i>k</i>-set is a collection of <i>k</i>-spaces in <span>\\({{\\,\\mathrm{\\textrm{PG}}\\,}}(n,q)\\)</span> or <span>\\({{\\,\\mathrm{\\textrm{AG}}\\,}}(n,q)\\)</span> admitting a certain parameter <i>x</i>, which is dependent on the size of this collection. One of the main research questions remains the (non-)existence of Cameron–Liebler <i>k</i>-sets with parameter <i>x</i>. This paper improves two non-existence results. First we show that the parameter of a non-trivial Cameron–Liebler <i>k</i>-set in <span>\\({{\\,\\mathrm{\\textrm{PG}}\\,}}(n,q)\\)</span> should be larger than <span>\\(q^{n-\\frac{5k}{2}-1}\\)</span>, which is an improvement of an earlier known lower bound. Secondly, we prove a modular equality on the parameter <i>x</i> of Cameron–Liebler <i>k</i>-sets in <span>\\({{\\,\\mathrm{\\textrm{PG}}\\,}}(n,q)\\)</span> with <span>\\(x<\\frac{q^{n-k}-1}{q^{k+1}-1}\\)</span>, <span>\\(n\\ge 2k+1\\)</span>, <span>\\(n-k+1\\ge 7\\)</span> and <span>\\(n-k\\)</span> even. In the affine case we show a similar result for <span>\\(n-k+1\\ge 3\\)</span> and <span>\\(n-k\\)</span> even. This is a generalization of earlier known modular equalities in the projective and affine case.</p>","PeriodicalId":11130,"journal":{"name":"Designs, Codes and Cryptography","volume":"13 1","pages":""},"PeriodicalIF":1.4000,"publicationDate":"2024-10-10","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":"{\"title\":\"On two non-existence results for Cameron–Liebler k-sets in $${{\\\\,\\\\mathrm{\\\\textrm{PG}}\\\\,}}(n,q)$$\",\"authors\":\"Jan De Beule, Jonathan Mannaert, Leo Storme\",\"doi\":\"10.1007/s10623-024-01505-8\",\"DOIUrl\":null,\"url\":null,\"abstract\":\"<p>This paper focuses on non-existence results for Cameron–Liebler <i>k</i>-sets. A Cameron–Liebler <i>k</i>-set is a collection of <i>k</i>-spaces in <span>\\\\({{\\\\,\\\\mathrm{\\\\textrm{PG}}\\\\,}}(n,q)\\\\)</span> or <span>\\\\({{\\\\,\\\\mathrm{\\\\textrm{AG}}\\\\,}}(n,q)\\\\)</span> admitting a certain parameter <i>x</i>, which is dependent on the size of this collection. One of the main research questions remains the (non-)existence of Cameron–Liebler <i>k</i>-sets with parameter <i>x</i>. This paper improves two non-existence results. First we show that the parameter of a non-trivial Cameron–Liebler <i>k</i>-set in <span>\\\\({{\\\\,\\\\mathrm{\\\\textrm{PG}}\\\\,}}(n,q)\\\\)</span> should be larger than <span>\\\\(q^{n-\\\\frac{5k}{2}-1}\\\\)</span>, which is an improvement of an earlier known lower bound. Secondly, we prove a modular equality on the parameter <i>x</i> of Cameron–Liebler <i>k</i>-sets in <span>\\\\({{\\\\,\\\\mathrm{\\\\textrm{PG}}\\\\,}}(n,q)\\\\)</span> with <span>\\\\(x<\\\\frac{q^{n-k}-1}{q^{k+1}-1}\\\\)</span>, <span>\\\\(n\\\\ge 2k+1\\\\)</span>, <span>\\\\(n-k+1\\\\ge 7\\\\)</span> and <span>\\\\(n-k\\\\)</span> even. In the affine case we show a similar result for <span>\\\\(n-k+1\\\\ge 3\\\\)</span> and <span>\\\\(n-k\\\\)</span> even. This is a generalization of earlier known modular equalities in the projective and affine case.</p>\",\"PeriodicalId\":11130,\"journal\":{\"name\":\"Designs, Codes and Cryptography\",\"volume\":\"13 1\",\"pages\":\"\"},\"PeriodicalIF\":1.4000,\"publicationDate\":\"2024-10-10\",\"publicationTypes\":\"Journal Article\",\"fieldsOfStudy\":null,\"isOpenAccess\":false,\"openAccessPdf\":\"\",\"citationCount\":\"0\",\"resultStr\":null,\"platform\":\"Semanticscholar\",\"paperid\":null,\"PeriodicalName\":\"Designs, Codes and Cryptography\",\"FirstCategoryId\":\"100\",\"ListUrlMain\":\"https://doi.org/10.1007/s10623-024-01505-8\",\"RegionNum\":2,\"RegionCategory\":\"数学\",\"ArticlePicture\":[],\"TitleCN\":null,\"AbstractTextCN\":null,\"PMCID\":null,\"EPubDate\":\"\",\"PubModel\":\"\",\"JCR\":\"Q3\",\"JCRName\":\"COMPUTER SCIENCE, THEORY & METHODS\",\"Score\":null,\"Total\":0}","platform":"Semanticscholar","paperid":null,"PeriodicalName":"Designs, Codes and Cryptography","FirstCategoryId":"100","ListUrlMain":"https://doi.org/10.1007/s10623-024-01505-8","RegionNum":2,"RegionCategory":"数学","ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q3","JCRName":"COMPUTER SCIENCE, THEORY & METHODS","Score":null,"Total":0}
引用次数: 0
摘要
本文主要研究卡梅隆-利伯勒 k 集的不存在结果。Cameron-Liebler k 集是 \({{\,\mathrm\textrm{PG}}\,}}(n,q)\) 或 \({{\,\mathrm\textrm{AG}}\,}}(n,q)\) 中的 k 空间集合,它允许一定的参数 x,而这个参数取决于这个集合的大小。本文改进了两个不存在结果。首先,我们证明了在\({{\,\mathrm{textrm{PG}},}(n,q)\)中的非难卡梅隆-利勃勒 k 集的参数应该大于\(q^{n-\frac{5k}{2}-1}\),这是对早期已知下限的改进。其次,我们证明了在\({{\,\mathrm{textrm{PG}}\,}}(n,q)\)中卡梅隆-利伯勒 k 集的参数 x 上的模相等,其中 \(x<\frac{q^{n-k}-1}{q^{k+1}-1}\)、\(n/ge 2k+1\)、\(n-k+1/ge 7\) 和\(n-k\) 偶数。在仿射情况下,我们对(n-k+1ge 3)和(n-k)偶数证明了类似的结果。这是对早先已知的投影和仿射情况下的模等式的推广。
On two non-existence results for Cameron–Liebler k-sets in $${{\,\mathrm{\textrm{PG}}\,}}(n,q)$$
This paper focuses on non-existence results for Cameron–Liebler k-sets. A Cameron–Liebler k-set is a collection of k-spaces in \({{\,\mathrm{\textrm{PG}}\,}}(n,q)\) or \({{\,\mathrm{\textrm{AG}}\,}}(n,q)\) admitting a certain parameter x, which is dependent on the size of this collection. One of the main research questions remains the (non-)existence of Cameron–Liebler k-sets with parameter x. This paper improves two non-existence results. First we show that the parameter of a non-trivial Cameron–Liebler k-set in \({{\,\mathrm{\textrm{PG}}\,}}(n,q)\) should be larger than \(q^{n-\frac{5k}{2}-1}\), which is an improvement of an earlier known lower bound. Secondly, we prove a modular equality on the parameter x of Cameron–Liebler k-sets in \({{\,\mathrm{\textrm{PG}}\,}}(n,q)\) with \(x<\frac{q^{n-k}-1}{q^{k+1}-1}\), \(n\ge 2k+1\), \(n-k+1\ge 7\) and \(n-k\) even. In the affine case we show a similar result for \(n-k+1\ge 3\) and \(n-k\) even. This is a generalization of earlier known modular equalities in the projective and affine case.
期刊介绍:
Designs, Codes and Cryptography is an archival peer-reviewed technical journal publishing original research papers in the designated areas. There is a great deal of activity in design theory, coding theory and cryptography, including a substantial amount of research which brings together more than one of the subjects. While many journals exist for each of the individual areas, few encourage the interaction of the disciplines.
The journal was founded to meet the needs of mathematicians, engineers and computer scientists working in these areas, whose interests extend beyond the bounds of any one of the individual disciplines. The journal provides a forum for high quality research in its three areas, with papers touching more than one of the areas especially welcome.
The journal also considers high quality submissions in the closely related areas of finite fields and finite geometries, which provide important tools for both the construction and the actual application of designs, codes and cryptographic systems. In particular, it includes (mostly theoretical) papers on computational aspects of finite fields. It also considers topics in sequence design, which frequently admit equivalent formulations in the journal’s main areas.
Designs, Codes and Cryptography is mathematically oriented, emphasizing the algebraic and geometric aspects of the areas it covers. The journal considers high quality papers of both a theoretical and a practical nature, provided they contain a substantial amount of mathematics.
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