On defectless unibranched simple extensions, complete distinguished chains and certain stability results

Abstract

Let (K,v) be a valued field. Take an extension of v to a fixed algebraic closure L of K. In this paper we show that an element a∈ L admits a complete distinguished chain over K if and only if the extension (K(a)|K,v) is defectless and unibranched. This characterization generalizes the known result in the henselian case. In particular, our result shows that if a admits a complete distinguished chain over K, then it also admits one over the henselization; however, the converse may not be true. The main tool employed in our analysis is the stability of the j-invariant associated to a valuation transcendental extension under passage to the henselization. We also explore the stability of defectless simple extensions in the following sense: let (K(X)|K,w) be a valuation transcendental extension with a pair of definition (b,γ). Assume that either (K(b)|K,v) is a defectless extension, or that f(X) is a key polynomial for w over K, where f(X) is the minimal polynomial of b over K. We show that then the extension (K(b,X)|K(X),w) is defectless. In particular, the extension (K(b,X)|K(X),w) is always defectless whenever (b,γ) is a minimal pair of definition for w over K.

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