Weighted Sum Formulas from Shuffle Products of Multiple Zeta-star Values

Abstract

In this paper, we are going to perform the shuffle products of Z-(n) = Σa+b=m (-1)b ζ(\1\a,b+2) and Z+(n) = Σc+d=n ζ(\1\c,d+2) with m+n = p. The resulted shuffle relation is a weighted sum formula given by equation* (p+1)(p+2)2 ζ(p+4) =Σm+n=p Σ|α|=p+3 ζ(α0, α1, …, αm, αm+1+1) Σa+b+c=m ( Wα(a,b,c) + Wα(a,b,c=0) + Wα(a=0,b,c) + Wα(a=0,b=m,c=0) ), equation* where Wα(a,b,c) = 2σ(a+b+1)-σ(a)-(b+1) (1-21-αa+b+1\ \ ), with σ(r) = Σj=0r αj.