A+ CATEGORY SCIENTIFIC UNIT

PDF files of articles are only available for institutions which have paid for the online version upon signing an Institutional User License.

On the conical zeta values and the Dedekind zeta values for totally real fields

Volume 216 / 2024

Hohto Bekki Acta Arithmetica 216 (2024), 177-196 MSC: Primary 11R42; Secondary 11R80, 11M32 DOI: 10.4064/aa231026-21-5 Published online: 16 October 2024

Abstract

Conical zeta values are a generalization of multiple zeta values which are defined by certain multiple sums over convex cones. We present a relation between the values of the Dedekind zeta functions for totally real fields and the conical zeta values for certain algebraic cones. More precisely, we show that the values of the partial zeta functions for totally real fields can be expressed as rational linear combinations of the conical zeta values associated with certain algebraic cones up to the square root of the discriminant.

Authors

  • Hohto BekkiMax Planck Institute for Mathematics
    53111 Bonn, Germany
    e-mail

Search for IMPAN publications

Query phrase too short. Type at least 4 characters.

Rewrite code from the image

Reload image

Reload image