Title of article
An analogue of Hilbertʹs 10th problem for fields of meromorphic functions over non-Archimedean valued fields
Author/Authors
X. Vidaux، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2003
Pages
26
From page
48
To page
73
Abstract
Let K be a complete and algebraically closed valued field of characteristic 0. We prove that the set of rational integers is positive existentially definable in the field of meromorphic functions on K in the language of rings augmented by a constant symbol for the independent variable z and by a symbol for the unary relation “the function x takes the value 0 at 0”. Consequently, we prove that the positive existential theory of in the language is undecidable. In order to obtain these results, we obtain a complete characterization of all analytic projective maps (over K) from an elliptic curve minus a point to , for any elliptic curve defined over the field of constants.
Keywords
Meromorphic functions , p-adic Analysis , Hilbert’s10th problem
Journal title
Journal of Number Theory
Serial Year
2003
Journal title
Journal of Number Theory
Record number
715475
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