Seminar

DDC - Definability seminar: New cases of Hilbert's Tenth problem for rings of integers of number fields

October 28, 2020 (10:00 AM PDT - 11:00 AM PDT)

Parent Program:	Decidability, definability and computability in number theory: Part 1 - Virtual Semester
Location:	SLMath: Online/Virtual

Speaker(s)

Natalia Garcia-Fritz (Pontificia Universidad Católica de Chile)

Description

To participate in this seminar, please register here: https://www.msri.org/seminars/25206

Keywords and Mathematics Subject Classification (MSC)

Primary Mathematics Subject Classification No Primary AMS MSC

Secondary Mathematics Subject Classification No Secondary AMS MSC

Video

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Abstract/Media

To participate in this seminar, please register here: https://www.msri.org/seminars/25206

Abstract:

After the solution by Davis, Putnam, Robinson and Matiyasevich of Hilbert's Tenth problem for the integers, a natural extension that remains mostly open is the analogue for rings of integers of number fields.

Several cases were proved in the seventies and eighties by Denef, Lipshitz, Pheidas, Shlapentokh, Videla and Shapiro, but after that point there has been a long hiatus on unconditional results. Most recently, elliptic curve criteria by Poonen, Cornelissen-Pheidas-Zahidi and Shlapentokh have led to a complete solution under standard arithmetic conjectures, thanks to the work of Mazur-Rubin and Murty-Pasten.

In this talk, I will present some unconditional cases that we recently proved in joint work with Hector Pasten. The proof is based on the elliptic curve criteria, and it uses recent techniques from Iwasawa theory and Heegner points.

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