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Non-sums of two cubes of algebraic integers

Volume 163 / 2021

Albertas Zinevičius Colloquium Mathematicum 163 (2021), 285-293 MSC: 11D25, 11R04. DOI: 10.4064/cm7945-11-2019 Published online: 23 July 2020

Abstract

It is deduced from class field theory and bounds on the Carmichael function that, given a number field, there exist infinitely many rational prime numbers that cannot be written as a sum of two cubes of integers of the field.

Authors

  • Albertas ZinevičiusFaculty of Mathematics and Informatics
    Vilnius University
    Naugarduko 24
    LT-03225 Vilnius, Lithuania
    e-mail

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