Enumeration of Isomorphism Classes of Extensions of p-adic Fields
Abstract
Let be an algebraic closure of Qp and let F be a finite extension of Qp contained in . Given positive integers f and e, the number of extensions K/F contained in with residue degree f and ramification index e was computed by Krasner. This paper is concerned with the number I(F,f,e) of F-isomorphism classes of such extensions. We determine I(F,f,e) completely when p2 e and get partial results when p2 e. When s is large, I( Qp,f,e) is equal to the number of isomorphism classes of finite commutative chain rings with residue field Fpf, ramification index e, and length s.
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