Two upper bounds for the Erdos--Hooley Delta-function
Abstract
For integer n≥slant 1 and real u, let (n,u):=|\d:d n,\, eu<d≤slant eu+1\|. The Erdos--Hooley Delta-function is then defined by (n):=u∈ R(n,u). We improve the current upper bounds for the average and normal orders of this arithmetic function.
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