Explicit formulas and asymptotic expansions for certain mean square of Hurwitz zeta-functions: III

The main object of this paper is the mean square I-h(s) of higher derivatives of Hurwitz zeta functions zeta(s, alpha). We shall prove asymptotic formulas for I-h(1/2 + it) as t --> +infinity with the coefficients in closed expressions (Theorem 1). We also prove a certain explicit formula for I-h(1/2 + it) (Theorem 2), in which the coefficients are, in a sense, not explicit. However, one merit of this formula is that it contains sufficient information for obtaining the complete asymptotic expansion for I-h(1/2 + it) when h is small. Another merit is that Theorem 1 can be strengthened with the aid of Theorem 2 (see Theorem 3). The fundamental method for the proofs is Atkinson's dissection argument applied to the product zeta(u, alpha)zeta(nu, alpha) with the independent complex variables u and nu.