The spectrum for large sets of idempotent quasigroups

被引:0
|
作者
Chang, YX [1 ]
机构
[1] No Jiatong Univ, Dept Math, Beijing 100044, Peoples R China
来源
JOURNAL OF COMBINATORIAL DESIGNS | 2000年 / 8卷 / 02期
关键词
quasigroup; orthogonal array; large set of idempotent quasigroups;
D O I
10.1002/(SICI)1520-6610(2000)8:2<79::AID-JCD1>3.3.CO;2-8
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
In this article we construct a large set of idempotent quasigroups of order 14. Combined with the results in Chang, JCMCC; and Teirlinck and Lindner, fur J Combin 9 (1988), 83-89, this shows that the spectrum for large sets of idempotent quasigroups of order n [briefly, LIQ(n)] is the set all integers n greater than or equal to 3 with the exception of n = 6. (C) 2000 John Wiley & Sons, Inc.
引用
收藏
页码:79 / 82
页数:4
相关论文
共 50 条
  • [1] THE CONSTRUCTION OF LARGE SETS OF IDEMPOTENT QUASIGROUPS
    TEIRLINCK, L
    LINDNER, CC
    [J]. EUROPEAN JOURNAL OF COMBINATORICS, 1988, 9 (01) : 83 - 89
  • [2] Computer Search for Large Sets of Idempotent Quasigroups
    Ma, Feifei
    Zhang, Jian
    [J]. COMPUTER MATHEMATICS, 2008, 5081 : 349 - 358
  • [3] The existence of overlarge sets of idempotent quasigroups
    Chang, YX
    Lei, JG
    [J]. ACTA MATHEMATICA SCIENTIA, 2004, 24 (02) : 165 - 170
  • [4] Overlarge sets of resolvable idempotent quasigroups
    Chang, Yanxun
    Lo Faro, Giovanni
    Tripodi, Antoinette
    Zhou, Junling
    [J]. DISCRETE MATHEMATICS, 2012, 312 (08) : 1461 - 1467
  • [5] THE EXISTENCE OF OVERLARGE SETS OF IDEMPOTENT QUASIGROUPS
    常彦勋
    雷建国
    [J]. Acta Mathematica Scientia, 2004, (02) : 165 - 170
  • [6] Investigating the Existence of Large Sets of Idempotent Quasigroups via Satisfiability Testing
    Huang, Pei
    Ma, Feifei
    Ge, Cunjing
    Zhang, Jian
    Zhang, Hantao
    [J]. AUTOMATED REASONING, IJCAR 2018, 2018, 10900 : 354 - 369
  • [7] Transitive resolvable idempotent symmetric quasigroups and large sets of Kirkman triple systems
    Zhang, S
    Zhu, L
    [J]. DISCRETE MATHEMATICS, 2002, 247 (1-3) : 215 - 223
  • [8] Transitive resolvable idempotent quasigroups and large sets of resolvable Mendelsohn triple systems
    Chang, Yanxun
    [J]. DISCRETE MATHEMATICS, 2009, 309 (20) : 5926 - 5931
  • [9] The spectrum for large sets of resolvable idempotent Latin squares
    Li, Xiangqian
    Chang, Yanxun
    [J]. JOURNAL OF COMBINATORIAL DESIGNS, 2022, 30 (10) : 671 - 683
  • [10] The Structure of Idempotent Translatable Quasigroups
    Wieslaw A. Dudek
    Robert A. R. Monzo
    [J]. Bulletin of the Malaysian Mathematical Sciences Society, 2020, 43 : 1603 - 1621
12345