TESTING ISOMORPHISM OF CENTRAL CAYLEY GRAPHS OVER ALMOST SIMPLE GROUPS IN POLYNOMIAL TIME

I. Ponomarenko; A. Vasil’ev

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TESTING ISOMORPHISM OF CENTRAL CAYLEY GRAPHS OVER ALMOST SIMPLE GROUPS IN POLYNOMIAL TIME

机译：多项式时间内在几乎简单组上测试中央凯利图的同构

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A Cayley graph over a group G is said to be central if its connection set is a normal subset of G. It is proved that for any two central Cayley graphs over explicitly given almost simple groups of order n, the set of all isomorphisms from the first graph onto the second can be found in time poly (n).

机译：如果组G上的Cayley图的连接集是G的一个正常子集，则称该Cayley图为中心。事实证明，对于显式给定的几乎简单的n阶组的任意两个中央Cayley图，其全同构集在时间poly（n）中可以找到第一个图到第二个图。

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《Journal of Mathematical Sciences》 |2018年第2期|219-236|共18页
作者
I. Ponomarenko; A. Vasil’ev;
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TESTING ISOMORPHISM OF CENTRAL CAYLEY GRAPHS OVER ALMOST SIMPLE GROUPS IN POLYNOMIAL TIME

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