摘要
在组合设计的研究领域中,如何构造具有给定参数的t-设计是一个重要而且困难的问题.利用设计的自同构群来构造t-设计是这一问题有效的解决方法之一.在本文中,设D=(X,B)是一个4-(q+1,5,λ)设计,G≤Aut(D)区传递地作用在D上且X=GF(q)∪{∞},这里GF(q)是q元有限域.设PSL(2,q)(?)G≤PTL(2,q).利用Kramer和Mesner的关于构造区组设计的一个结果和二维射影线性群作用在X的5-子集的集合上的轨道,得到了如下结果:(1)G=PGL(2,17)并且D是一个4-(18,5,4)设计;或(2)G=PSL(2,32)并且D是一个4-(33,5,4)设计;或(3)G=PTL(2,32)并且D是4-(33,5,5)和4-(33,5,20)设计之一.
Constructing t-designs with given parameters is an important and difficult problem in the field of combinatoric design theory. It is an effective method to construct a tdesign using its automorphism group. In this paper, let :D=(X, B) be a 4-(q+ 1, 5, λ) design, and G 〈 Aut(D) act block-transitively on :D, where X = GF(q) ∪ {∞} and GF(q) is a finite field of order q. Let PSL(2, q)←△ G ≤ PFL(2, q). Using a result of Kramer and Mesner and the orbits from the action of the two-dimensional projective linear group on the set of 5-element subsets of X, our main results are as follows:
(1) G = PGL(2, 17) and D is a 4-(18, 5, 4) design; or
(2) G = PSL(2, 32) and D is a 4-(33, 5, 4) design; or
(3) G PFL(2, 32) and I) is a 4-(33, 5, 5) or a 4-(33, 5, 20) design.
出处
《数学进展》
CSCD
北大核心
2012年第5期547-553,共7页
Advances in Mathematics(China)
基金
国家自然科学基金(No.10871205
No.11271208)
湖南省教育厅基金(No.08c021)
湖南第一师范学院校级课题(No.XYS07N07)
关键词
二维射影线性群
区传递
4-设计
two-dimensional projective linear group
block-transitive
4-design
