Estimates of lengths of shortest nonzero vectors in some lattices. I

IF 0.3 Q4 MATHEMATICS, APPLIED Discrete Mathematics and Applications Pub Date : 2022-06-01 DOI:10.1515/dma-2022-0018
A. S. Rybakov
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Abstract

Abstract In 1988, Friese et al. put forward lower estimates for the lengths of shortest nonzero vectors for “almost all” lattices of some families in the dimension 3. In 2004, the author of the present paper obtained a similar result for the dimension 4. Here we give a better estimate for the cardinality of the set of exceptional lattices for which the above estimates are not valid. In the case of dimension 4 we improve the upper estimate for an arbitrary chosen parameter that controls the accuracy of these lower estimates and for the number of exceptions. In this (first) part of the paper, we also prove some auxiliary results, which will be used in the second (main) part of the paper, in which an analogue of A. Friese et al. result will be given for dimension 5.
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一些格中最短非零向量长度的估计。我
摘要1988年,Friese等人对维数为3的一些族的“几乎所有”格的最短非零向量的长度提出了较低的估计。2004年,本论文的作者在维度4上获得了类似的结果。在这里,我们对上述估计无效的异常格集的基数给出了更好的估计。在维度4的情况下,我们改进了任意选择的参数的上限估计,该参数控制了这些下限估计的准确性和异常数量。在论文的这(第一)部分中,我们还证明了一些辅助结果,这些结果将在论文的第二(主要)部分中使用,其中A.Friese等人的结果将在维度5中给出。
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来源期刊
CiteScore
0.60
自引率
20.00%
发文量
29
期刊介绍: The aim of this journal is to provide the latest information on the development of discrete mathematics in the former USSR to a world-wide readership. The journal will contain papers from the Russian-language journal Diskretnaya Matematika, the only journal of the Russian Academy of Sciences devoted to this field of mathematics. Discrete Mathematics and Applications will cover various subjects in the fields such as combinatorial analysis, graph theory, functional systems theory, cryptology, coding, probabilistic problems of discrete mathematics, algorithms and their complexity, combinatorial and computational problems of number theory and of algebra.
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