Resolution of Erdos' problems about unimodularity
Abstract
Letting δ1(n,m) be the density of the set of integers with exactly one divisor in (n,m), Erdos wondered if δ1(n,m) is unimodular for fixed n. We prove this is false in general, as the sequence (δ1(n,m)) has superpolynomially many local extrema. However, we confirm unimodality in the single case for which it occurs; n = 1. We also solve the question on unimodality of the density of integers whose kth prime is p.
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