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Hauptverfasser: Braun, J., Bentz, H. J.
Format: Preprint
Veröffentlicht: 2026
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Online-Zugang:https://arxiv.org/abs/2605.06034
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author Braun, J.
Bentz, H. J.
author_facet Braun, J.
Bentz, H. J.
contents We present a study on cubic Euler sums of degree four, five and six, where three different types of denominators $1/k^n$, $1/((2k-1)^n)$ and $1/(k(2k-1))$ will be considered We demonstrate that for all three orders the complete variety of corresponding nonlinear Euler sums belonging to the eight different families can be explicitly calculated in terms of zeta values and polylogarithmic values $Li_4(1/2)$, $Li_5(1/2)$, $Li_6(1/2)$, $Li_6(-1/2)$ and $Li_6(-1/8)$.
format Preprint
id arxiv_https___arxiv_org_abs_2605_06034
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Evaluation of eight different families of cubic Euler sums
Braun, J.
Bentz, H. J.
Number Theory
We present a study on cubic Euler sums of degree four, five and six, where three different types of denominators $1/k^n$, $1/((2k-1)^n)$ and $1/(k(2k-1))$ will be considered We demonstrate that for all three orders the complete variety of corresponding nonlinear Euler sums belonging to the eight different families can be explicitly calculated in terms of zeta values and polylogarithmic values $Li_4(1/2)$, $Li_5(1/2)$, $Li_6(1/2)$, $Li_6(-1/2)$ and $Li_6(-1/8)$.
title Evaluation of eight different families of cubic Euler sums
topic Number Theory
url https://arxiv.org/abs/2605.06034