Remarks on Milnor K-theory and Tate's conjecture for divisors

Research output: Working paper/PreprintPreprint

Authors

  • Stefan Schreieder

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Original languageEnglish
Publication statusE-pub ahead of print - 26 Jun 2024

Abstract

We show that the Tate conjecture for divisors over a finite field $\mathbb F$ is equivalent to an explicit algebraic problem about the third Milnor K-group of the function field $\bar {\mathbb F}(x,y,z)$ in three variables over $\bar {\mathbb F}$.

Keywords

    math.AG, math.KT, math.NT, 14C15, 14C25, 14C35

Cite this

Remarks on Milnor K-theory and Tate's conjecture for divisors. / Schreieder, Stefan.
2024.

Research output: Working paper/PreprintPreprint

Schreieder, S. (2024). Remarks on Milnor K-theory and Tate's conjecture for divisors. Advance online publication.
Schreieder S. Remarks on Milnor K-theory and Tate's conjecture for divisors. 2024 Jun 26. Epub 2024 Jun 26.
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