Group Extension Problem
碩士 === 國立臺灣大學 === 數學研究所 === 94 === In this paper, we discuss the extensions of (Zp)^r by Zp for arbitrary rЄN. belonging to natural number. In order to deal with this problem, we use the theory of group extensions, which is a beautiful application of group cohomology. Furthermore, we also exhibit 2-...
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ndltd-TW-094NTU054790282015-12-16T04:38:40Z http://ndltd.ncl.edu.tw/handle/93940073684277316614 Group Extension Problem 群擴張問題 Yan-Ji Li 李硯吉 碩士 國立臺灣大學 數學研究所 94 In this paper, we discuss the extensions of (Zp)^r by Zp for arbitrary rЄN. belonging to natural number. In order to deal with this problem, we use the theory of group extensions, which is a beautiful application of group cohomology. Furthermore, we also exhibit 2-cocycles in C^2((Zp)^r, Zp) explicitly. 康明昌 2006 學位論文 ; thesis 26 en_US |
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碩士 === 國立臺灣大學 === 數學研究所 === 94 === In this paper, we discuss the extensions of (Zp)^r
by Zp for arbitrary rЄN. belonging to natural number. In order to deal with this problem, we use the theory
of group extensions, which is a beautiful application of group cohomology. Furthermore, we also exhibit 2-cocycles in C^2((Zp)^r, Zp) explicitly.
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康明昌 |
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康明昌 Yan-Ji Li 李硯吉 |
author |
Yan-Ji Li 李硯吉 |
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Yan-Ji Li 李硯吉 Group Extension Problem |
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Yan-Ji Li |
title |
Group Extension Problem |
title_short |
Group Extension Problem |
title_full |
Group Extension Problem |
title_fullStr |
Group Extension Problem |
title_full_unstemmed |
Group Extension Problem |
title_sort |
group extension problem |
publishDate |
2006 |
url |
http://ndltd.ncl.edu.tw/handle/93940073684277316614 |
work_keys_str_mv |
AT yanjili groupextensionproblem AT lǐyànjí groupextensionproblem AT yanjili qúnkuòzhāngwèntí AT lǐyànjí qúnkuòzhāngwèntí |
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1718151177618587648 |