On the convolutions of sums of multiple zeta(-star) values of height one
Abstract
In this paper, we investigate the sums of mutliple zeta(-star) values of height one: Z(n)=Σa+b=n ( 1)bζ(\1\a,b+2), Z(n)=Σa+b=n ( 1)bζ(\1\a,b+2). In particular, we prove that the weighted sum Σ0≤ m≤ p\\ m: even Σα=p+3 2αm+1\ +1ζ(α0,α1,…,αm,αm+1+1) can be evaluated through the convolution of Z-(m) and Z+(n) with m+n=p.
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