Steiner三元系统的3向花交问题

Discret. Math. Theor. Comput. Sci. Pub Date : 2019-08-19 DOI:10.23638/DMTCS-22-1-5

H. Amjadi, N. Soltankhah

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引用次数: 1

摘要

斯坦纳三系(x;B)是包含x的所有三元组的集合。用J3F(r)表示所有整数k的集合，使得在相同的k + r个三元组集合中存在三个STS(2r+1)相互相交的集合，其中r个是一个普通花的三元组。在本文中，我们确定了任意正整数r = 0,1 (mod 3)的集合J3F(r)(对于r = 6,7,9,24，只有一些情况是不确定的)，并建立了对于r = 0,1 (mod 3)的集合J3F(r) = I3F(r)其中I3F(r) ={0,1，…， 2r(r-1)/3- 8,2r (r-1)/3- 6,2r (r-1)/3}。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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The 3-way flower intersection problem for Steiner triple systems

The flower at a point x in a Steiner triple system (X; B) is the set of all triples containing x. Denote by J3F(r) the set of all integers k such that there exists a collection of three STS(2r+1) mutually intersecting in the same set of k + r triples, r of them being the triples of a common flower. In this article we determine the set J3F(r) for any positive integer r = 0, 1 (mod 3) (only some cases are left undecided for r = 6, 7, 9, 24), and establish that J3F(r) = I3F(r) for r = 0, 1 (mod 3) where I3F(r) = {0, 1,..., 2r(r-1)/3-8, 2r(r-1)/3-6, 2r(r-1)/3}.

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Discret. Math. Theor. Comput. Sci.

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