TY - JOUR
T1 - Asymptotic expansions of multiple zeta functions and power mean values of Hurwitz zeta functions
AU - Egami, Shigeki
AU - Matsumoto, Kohji
PY - 2002/8
Y1 - 2002/8
N2 - Let ζ (s, α) be the Hurwitz zeta function with parameter α. Power mean values of the form ∑a=1qζ(s,a/q)h or ∑a=1qζ(s,a/q)2h are studied, where q and h are positive integers. These mean values can be written as linear combinations of ∑a=1qζr(S1,., Sr;a/q), where ζr(S1., Sr; α) is a generalization of Euler-Zagier multiple zeta sums. The Mellin-Barnes integral formula is used to prove an asymptotic expansion of ∑a=1qζr(S1,., Sr,;a/q) with respect to q. Hence a general way of deducing asymptotic expansion formulas for ∑a=1qζ(s, a/q)h and ∑a=1qζ(s, a/q)2h is obtained. In particular, the asymptotic expansion of ∑a=1qζ(1/2, a/q)3 with respect to q is written down.
AB - Let ζ (s, α) be the Hurwitz zeta function with parameter α. Power mean values of the form ∑a=1qζ(s,a/q)h or ∑a=1qζ(s,a/q)2h are studied, where q and h are positive integers. These mean values can be written as linear combinations of ∑a=1qζr(S1,., Sr;a/q), where ζr(S1., Sr; α) is a generalization of Euler-Zagier multiple zeta sums. The Mellin-Barnes integral formula is used to prove an asymptotic expansion of ∑a=1qζr(S1,., Sr,;a/q) with respect to q. Hence a general way of deducing asymptotic expansion formulas for ∑a=1qζ(s, a/q)h and ∑a=1qζ(s, a/q)2h is obtained. In particular, the asymptotic expansion of ∑a=1qζ(1/2, a/q)3 with respect to q is written down.
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U2 - 10.1112/S0024610702003253
DO - 10.1112/S0024610702003253
M3 - Article
AN - SCOPUS:0036689533
SN - 0024-6107
VL - 66
SP - 41
EP - 60
JO - Journal of the London Mathematical Society
JF - Journal of the London Mathematical Society
IS - 1
ER -