Superficies el\'ipticas y el d\'ecimo problema de Hilbert

Abstract

A negative solution to Hilbert's tenth problem for the ring of integers OF of a number field F would follow if Z were Diophantine in OF. Denef and Lipshitz conjectured that the latter occurs for every number field F. In this note we show that the conjecture of Denef and Lipshitz is a consequence of a well-known conjecture on elliptic surfaces. -- Es sabido que se obtendr\'ia una soluci\'on negativa al d\'ecimo problema de Hilbert para el anillo de enteros OF de un campo de n\'umeros F si Z fuera diofantino en OF. Denef y Lipshitz conjeturaron que esto \'ultimo ocurre para todo F. En esta nota se demuestra que la conjetura de Denef y Lipshitz es consecuencia de una conocida conjetura sobre superficies el\'ipticas.

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