| ID |
56017 |
| FullText URL |
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| Author |
Minamide, Arata
Research Institute for Mathematical Sciences Kyoto University
|
| Abstract |
In this paper, we prove that the etale fundamental group of a hyperbolic curve over an arithmetic field [e.g., a finite extension field of Q or Qp] or an algebraically closed field is indecomposable [i.e., cannot be decomposed into the direct product of nontrivial profinite groups]. Moreover, in the case of characteristic zero, we also prove that the etale fundamental group of the configuration space of a curve of the above type is indecomposable. Finally, we consider the topic of indecomposability in the context of the comparison of the absolute Galois group of Q with the Grothendieck-Teichmuller group GT and pose the question: Is GT indecomposable? We give an affirmative answer to a pro-l version of this question
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| Keywords |
indecomposability
etale fundamental group
hyperbolic curve
con�guration space
Grothendieck-Teichmuller group
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| Note |
Mathematics Subject Classi�cation. Primary 14H30; Secondary 11R99.
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| Published Date |
2018-01
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| Publication Title |
Mathematical Journal of Okayama University
|
| Volume |
volume60
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| Issue |
issue1
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| Publisher |
Department of Mathematics, Faculty of Science, Okayama University
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| Start Page |
175
|
| End Page |
208
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| ISSN |
0030-1566
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| NCID |
AA00723502
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| Content Type |
Journal Article
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| Official Url |
http://www.math.okayama-u.ac.jp/mjou/
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| language |
English
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| Copyright Holders |
Copyright©2018 by the Editorial Board of Mathematical Journal of Okayama University
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| File Version |
publisher
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| Refereed |
True
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| Submission Path |
mjou/vol59/iss1/10
|
