在所有其固有子群是有限循环的群上

Mathematics of The Ussr-izvestiya Pub Date : 1992-04-30 DOI:10.1070/IM1992V039N02ABEH002232

S. I. Adyan, I. G. Lysënok

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引用次数: 46

摘要

对于任意奇数n≥1003，构造了一个无限2-生成群，其每个固有子群都包含在n阶循环子群中。这一结果加强了Ol’shanski_对于素数n>1075和Atabekyan和Ivanov对于奇数n>1080的类似结果。证明是用诺维科夫-阿德扬理论的原始语言进行的。参考书目:6篇。

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ON GROUPS ALL OF WHOSE PROPER SUBGROUPS ARE FINITE CYCLIC

For any odd number n≥1003, the authors construct an infinite 2-generator group each of whose proper subgroups is contained in a cyclic subgroup of order n. This result strengthens analogous results of Ol'shanskiĭ for prime n>1075 and Atabekyan and Ivanov for odd n>1080. The proof is carried out in the original language of Novikov-Adyan theory. Bibliography: 6 titles.

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Mathematics of The Ussr-izvestiya

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