弗兰克尔猜想的证明:一种非建设性方法

IF 0.3 Q4 MATHEMATICS Jordan Journal of Mathematics and Statistics Pub Date : 2022-01-01 DOI:10.3844/jmssp.2022.134.137

Yonghong Liu

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引用次数: 0

摘要

:设U是一个有限集，X是U的非空子集族，U的子集在并并下闭。建立了Frankl猜想与等价集之间的联系，其中互补集是Frobenius群上的等价集。我们用非建设性的方法完成了并闭集的证明。证明依赖于我们需要证明，素数的级数是发散的，并且存在xi至少一半分布在子集中。

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Proof of Frankl's Conjecture: A Non-Constructive Approach

: Let U be a finite set and X a family of nonempty subsets of U , which is closed under unions. We establish a connection between Frankl's conjecture and equipollence sets, in which a complementary set is an Equipollence set on the Frobenius group. We complete the proof of the union-closed sets using a non-constructive approach. The proof relies upon that we need to prove, that the series of the prime divisor diverges, and there exists x i which appears at least half distributed in subsets.

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来源期刊

Jordan Journal of Mathematics and Statistics MATHEMATICS-

CiteScore

0.70

自引率

33.30%

发文量