p-adic multiple zeta values of integer indices
Abstract
This paper concerns the p-adic multiple zeta values of integer indices that may contain zero or negative components. We introduce the admissibility and regularizability conditions for integer indices. We define the p-adic multiple zeta values associated with admissible integer indices to be finite rational linear combinations of p-adic multiple zeta values associated with admissible positive integer indices. We prove that the double shuffle relations, that is, the shuffle and stuffle product formulas, both hold for the values.
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