New Rational Points of Algebraic Curves over Extension Fields

Cite

Institut des Hautes Études Scientifiques (IHÉS)

Mazur, Barry

Formal Metadata

Title

New Rational Points of Algebraic Curves over Extension Fields

Title of Series

Journée Gretchen & Barry Mazur, 2019

Number of Parts

Author

Mazur, Barry

Contributors

Ullmo, Emmanuel

License

CC Attribution 3.0 Unported:
You are free to use, adapt and copy, distribute and transmit the work or content in adapted or unchanged form for any legal purpose as long as the work is attributed to the author in the manner specified by the author or licensor.

Identifiers

10.5446/46447 (DOI)

Publisher

Institut des Hautes Études Scientifiques (IHÉS)

Release Date

2019

Language

English

Content Metadata

Subject Area

Mathematics

Genre

Conference/Talk

Abstract

For L/K an extension of fields and V an algebraic variety over K say that V is Diophantine Stable for the extension L/K if V(L) = V(K). That is, if `V acquires no new rational points’ when one makes the field extension from K to L. I will describe some recent results joint with Karl Rubin regarding Diophantine Stability and give a survey of related recent statistics, heuristics, and conjectures.