Proves Z_q^o generates Z_q and Z_{q,1}^o generates Z_{q,1} via explicit integer relations obtained from finite recursive generating series then taking the limit.
and Watanabe, T., Deriving two dualities simultaneously from a family of identities for multiple harmonic sums, preprint, arXiv:2402.05730
2 Pith papers cite this work. Polarity classification is still indexing.
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2026 2verdicts
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The authors apply a q-analogue formula to prove duality of q-multiple zeta values and an identity for the q-Kawashima function.
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A unified proof of conjectures on the spaces of multiple $q$-zeta values
Proves Z_q^o generates Z_q and Z_{q,1}^o generates Z_{q,1} via explicit integer relations obtained from finite recursive generating series then taking the limit.
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Applications of a formula of Maesaka-Seki-Watanabe type for multiple harmonic $q$-sums
The authors apply a q-analogue formula to prove duality of q-multiple zeta values and an identity for the q-Kawashima function.