Restricted Sum Formula of Alternating Euler Sums

Abstract

In this paper we study restricted sum formulas involving alternating Euler sums which are defined by ζ(s1,...,sd;ε1,...,εd)=Σn1>...>nd 1ε1n1... εdndn1s1... ndsd, for all positive integers s1,...,sd and ε1= 1,..., εd= 1 with (s1,ε1) unequal (1,1). We call w=s1+...+sd the weight and d the depth. When εj=-1 we say the jth component is alternating. We first consider Euler sums of the following special type: (2s1,...,2sd)=ζ(2s1,...,2sd;(-1)s1,...,(-1)sd). For d n, let (2n,d) be the sum of all (2s1,..., 2sd) of fixed weight 2n and depth d. We derive a formula for (2n,d) using the theory of symmetric functions established by Hoffman recently. We also consider restricted sum formulas of Euler sums with fixed weight 2n, depth d and fixed number α of alternating components at even arguments. When α=1 or α=d we can determine precisely the restricted sum formulas. For other α we only treat the cases d<5 completely since the symmetric function theory becomes more and more unwieldy to work with when α moves closer to d/2.