Summary: | In this article, we are going to look at the requirements regarding a monotone function f ∈ ℝ →ℝ ≥0, and regarding the sets of natural numbers (Ai)i=1∞⊆dmn(f)\left( {{A_i}} \right)_{i = 1}^\infty \subseteq dmn\left( f \right), which requirements are sufficient for the asymptotic∑n∈ANP(n)≤Nθf(n)∼ρ(1/θ)∑n∈ANf(n)\sum\limits_{\matrix{{n \in {A_N}} \hfill \cr {P\left( n \right) \le {N^\theta }} \hfill \cr } } {f\left( n \right) \sim \rho \left( {1/\theta } \right)\sum\limits_{n \in {A_N}} {f\left( n \right)} } to hold, where N is a positive integer, θ ∈ (0, 1) is a constant, P(n) denotes the largest prime factor of n, and ρ is the Dickman function.
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