| 周士藩.内同构环与内异环的结构(英文)[J].数学研究及应用,1991,11(3):335~342 |
| 内同构环与内异环的结构(英文) |
| Structure of Inner Isomorphic and Inner Non-isomorphic Rings |
| 投稿时间:1989-11-20 |
| DOI:10.3770/j.issn:1000-341X.1991.03.004 |
| 中文关键词: |
| 英文关键词: |
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| 摘要点击次数: 1914 |
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| 中文摘要: |
| 所有真子环都同构的结合环,称为内同构环,任两不同的子环都不同构的结合环,称为内异环.本文目的是给出内同构环与内异环的一些结构定理,从而基本上解决了Szasz F.A.提出的问题81:怎样的结合环,它的不同子环总不同构? |
| 英文摘要: |
| An associative ring R is called an inner isomorphic, if any two proper sub-rings of it are isomorphic. An associative ring R is called an inner nonisomor-phic, if the distinct subrings of it are always non-isomorphic. In this paper, we obtain several structure theorems of inner isomorphic and inner non-isomor-phic ring, so that totally solve the open problem 81 provided by F. A. Szasz who asks "in which ring are the distinct subrings always non-isomorphic?" [1] additional, we point out that the main results and its proofs in paper[2] are mistaken. |
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