Diophantine stability for elliptic curves on average
Abstract
Let K be a number field and ≥ 5 a prime number. Mazur and Rubin introduced the notion of diophantine stability for a variety X/K at a prime . We show that there is a positive density set of elliptic curves E/Q of rank 1 such that E/K is diophantine stable at . This has implications for Hilbert's Tenth Problem over OK. This problem asks whether there exists an algorithm that decides in finite time whether a finite system of Diophantine equations over OK has a solution.
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