Primitive sets with large counting functions
Abstract
A set of positive integers is said to be primitive if no element of the set is a multiple of another. If S is a primitive set and S(x) is the number of elements of S not exceeding x, then a result of Erd os implies that ∫2∞ (S(t)/t2 t) dt converges. We establish an approximate converse to this theorem, showing that if F satisfies some mild conditions and ∫2∞ (F(t)/t2 t) dt converges, then there exists a primitive set S with S(x) F(x).
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