Tame Fields and Tame Extensions
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Sudesh K Khanduja
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Article
📅
1998
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Elsevier Science
🌐
English
⚖ 140 KB
Let V be a henselian valuation of any rank of a field K and let V be the extension of V to a fixed algebraic closure K of K. In this paper, it is proved that Ž . Ž . K,V is a tame field, i.e., every finite extension of K, V is tamely ramified, if and case of the previous result, when K is a perfect