A Regular Group Quorum System of Degree

机译：正规的群体仲裁度系统

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We consider the problem of constructing regular group quorum systems of large degree. In particular, we show that for every integer p > 1, there is a regular m-group quorum system over an n = ([p(p+ l)/2])-element set of degree [(p + 1)/2] = [(n+2)~(1/2)] for every m ≤ p, where each quorum has size p.

机译：我们考虑构建规则的大规模群体仲裁系统的问题。尤其是，我们表明，对于每个> 1的整数，在度数[（p + 1）/ 2]的n =（[p（p + 1）/ 2]）-元素集上都有一个规则的m组仲裁系统。对于每m≤p，] = [（n + 2）〜（1/2）]，其中每个仲裁群体的大小为p。

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《International conference on algorithms and architectures for parallel processing》|2012年|140-147|共8页
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Fouad B. Chedid;
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A Regular Group Quorum System of Degree

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