Coincidence among sum formulas for zeta-like multiple values
Abstract
We study two families of zeta-like multiple series -- the multiple -values and the multiple η-values -- defined by nested sums with shifted denominators. An explicit factorial formula for reveals its intrinsic combinatorial structure and leads to closed expressions for fixed weight and depth. A remarkable identity emerges from a weighted-sum transformation, exhibiting a perfect discrete balance. The main theorem proves that the total sums of - and η-values coincide for equal weight but complementary depths. This correspondence provides an analytic basis for integral representations of η-values and for deriving weighted sum relations. Together, these results show that the - and η-families form two complementary realizations of a unified analytic-combinatorial structure, bridging factorial and harmonic formulations in zeta-like multiple sums.
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