On three general forms of multiple zeta(-star) values
In this paper, we investigate three general forms of multiple zeta(-star) values. We use these values to give three new sum formulas for multiple zeta(-star) values with height $\leq 2$ and the evaluation of $\zeta^\star(\{1\}^m,\{2\}^{n+1})$. We also give a new proof of sum formula of multiple zeta...
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| creator | Chen, Kwang-Wu Eie, Minking |
| description | In this paper, we investigate three general forms of multiple zeta(-star)
values. We use these values to give three new sum formulas for multiple
zeta(-star) values with height $\leq 2$ and the evaluation of
$\zeta^\star(\{1\}^m,\{2\}^{n+1})$. We also give a new proof of sum formula of
multiple zeta values. |
| doi_str_mv | 10.48550/arxiv.2202.03839 |
| format | Article |
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values. We use these values to give three new sum formulas for multiple
zeta(-star) values with height $\leq 2$ and the evaluation of
$\zeta^\star(\{1\}^m,\{2\}^{n+1})$. We also give a new proof of sum formula of
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values. We use these values to give three new sum formulas for multiple
zeta(-star) values with height $\leq 2$ and the evaluation of
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values. We use these values to give three new sum formulas for multiple
zeta(-star) values with height $\leq 2$ and the evaluation of
$\zeta^\star(\{1\}^m,\{2\}^{n+1})$. We also give a new proof of sum formula of
multiple zeta values.</abstract><doi>10.48550/arxiv.2202.03839</doi><oa>free_for_read</oa></addata></record> |
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| subjects | Mathematics - Number Theory |
| title | On three general forms of multiple zeta(-star) values |
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