Asymptotic Estimates for Some Number Theoretic Power Series
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math.CO
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functionsasymptoticboundsestimatesabelianarithmeticclassicalderive
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We derive asymptotic bounds for the ordinary generating functions of several classical arithmetic functions, including the Moebius, Liouville, and von Mangoldt functions. The estimates result from the Korobov-Vinogradov zero-free region for the Riemann zeta-function, and are sharper than those obtained by Abelian theorems from bounds for the summatory functions.
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