Exponential sums twisted by general arithmetic functions
Abstract
We examine exponential sums of the form Σn X w(n) e2π iα nk, for k=1,2, where α satisfies a generalized Diophantine approximation and where w are different arithmetic functions that might be multiplicative, additive, or neither. A strategy is shown on how to bound these sums for a wide class of functions w belonging within the same ecosystem. Using this new technology we are able to improve current results on minor arcs that have recently appeared in the literature of the Hardy-Littlewood circle method. Lastly, we show how a bound on Σn X |μ(n)| e2π iα n can be used to study partitions asymptotics over squarefree parts and explain their connection to the zeros of the Riemann zeta-function.
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