A generalization of the duality for finite multiple harmonic q-series
Gaku Kawashima
TL;DR
This paper generalizes Bradley's duality result for partial sums of multiple q-zeta values, expanding the theoretical understanding of finite multiple harmonic q-series.
Contribution
It introduces a broader duality framework for finite multiple harmonic q-series, extending previous results by Bradley.
Findings
Generalized duality for finite multiple harmonic q-series
Extended the theoretical foundation of q-series dualities
Provides new insights into multiple q-zeta value relations
Abstract
Recently, Bradley studied partial sums of multiple q-zeta values and proved a duality result. In this paper, we present a generalization of his result.
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Taxonomy
TopicsAdvanced Mathematical Identities · Mathematical functions and polynomials · Analytic Number Theory Research