On partial derivatives of some summatory functions
Abstract
Let f be a real arithmetic function and let g:[1,∞[ R be a smooth function. We describe two emblematic instances in which saddle-point estimates may be used to evaluate the frequency, on the set of integers n≤slant x, of the event \f(n)≤slant g(n)\ from those relevant to the event \f(n)≤slant y\. The first example revisits Dickman's historical contribution to the theory of friable integers. The second is concerned with the distribution of the squarefree kernel of an integer.
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