Numbers of the form k+f(k)
Abstract
For a function f N, let N+f(x)=\n≤ x: n=k+f(k) for some k\. Let τ(n)=Σd|n1 be the divisor function, ω(n)=Σp|n1 be the prime divisor function, and (n)=\#\1≤ k≤ n: (k,n)=1 \ be Euler's totient function. We show that align* &(1) x N+ω(x), \\ &(2) x N+τ(x) ≤ 0.94x, \\ &(3) x N+(x) ≤ 0.93x. align*
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