Abstract
Let $(K,\nu)$ be a valued field and $K(x)$ a simple purely transcendental extension of $K$. In the nineteen thirties, in order to study the possible extensions of $\nu $ to $K(x)$, S. Mac Lane considered the special case when $\nu $ is discrete of rank $1$, and introduced the notion of key polynomials. M. Vaquié extended this definition to the case of arbitrary valuations.
In this paper we give a new definition of key polynomials (which we call abstract key polynomials) and study the relationship between them and key polynomials of Mac Lane–Vaquié.
Citation
J. Decaup. W. Mahboub. M. Spivakovsky. "Abstract key polynomials and comparison theorems with the key polynomials of Mac Lane–Vaquié." Illinois J. Math. 62 (1-4) 253 - 270, 2018. https://doi.org/10.1215/ijm/1552442662
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