Relations of multiple zeta values and their algebraic expression

We prove that certain families of duality relations of the multiple zeta values (MZV's) are consequences of the extended double shuffle relations (EDSR's), thereby proving a part of the conjecture that the EDSR's give all linear relations of the MZV's.

We define the number field analog of the zeta function of d-complex variables studied by Zagier in (

The algebraic and combinatorial theory of shuffles, introduced by Chen and Ree, is further developed and applied to the study of multiple zeta values. In particular, we establish evaluations for certain sums of cyclically generated multiple zeta values. The boundary case of our result reduces to a f

In this paper we present a relation among the multiple zeta values which generalizes simultaneously the ``sum formula'' and the ``duality'' theorem. As an application, we give a formula for the special values at positive integral points of a certain zeta function of Arakawa and Kaneko in terms of mu

## Abstract The set of multiple‐valued Kleenean functions define a model of a Kleene algebra (a fuzzy algebra) suitable for treating ambiguity. This paper enumerates the Kleenean functions exactly, using the relation that the mapping from __p__‐valued Kleenean functions to monotonic ternary input _