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The distribution and average order of the coefficients of Dedekind zeta functions. (English) Zbl 0515.10042

##### MSC:
 11N37 Asymptotic results on arithmetic functions 11R42 Zeta functions and $$L$$-functions of number fields
##### Keywords:
Dedekind zeta-function; omega-theorems
##### Citations:
Zbl 0211.379; Zbl 0458.10031
Full Text:
##### References:
 [1] Artin, E, Über eine neue art von L-reihen, Abh. math. sem. univ. Hamburg, 3, 89-108, (1923) · JFM 49.0123.01 [2] Chandrasekharan, K; Narasimhan, R, Functional equations with multiple gamma factors and the average order of arithmetic functions, Ann. math., 76, 93-136, (1962) · Zbl 0211.37901 [3] Hafner, J.L, On the average order of the divisor function, lattice point functions, and other arithmetical functions, () [4] Hafner, J.L, New omega theorems for two classical lattice point problems, Invent. math., 63, 181-186, (1981) · Zbl 0458.10031 [5] Hafner, J.L, On the average order of a class of arithmetical functions, J. number theory, 15, 36-76, (1982) · Zbl 0495.10027 [6] Hardy, G.H, On Dirichlet’s divisor problem, (), 1-25 · JFM 45.0305.02 [7] Szegö, G; Walfisz, A, Über des piltzsche teilerproblem in algebraischen zahlörpern (zweite abhandlung), Math. zeit., 26, 467-486, (1927) · JFM 53.0153.02
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