A Complete Answer to Erdos Problem 690

Abstract

Let \(dk(p)\) denote the natural density of positive integers whose \(k\)-th smallest prime divisor is \(p\). Erdos asked whether, for each fixed \(k\), the sequence \(p dk(p)\) is unimodal as \(p\) ranges over the primes. Cambie proved that unimodality holds for \(1 k3\) and verified non-unimodality for \(4 k20\). We prove that \(p dk(p)\) is not unimodal for every \(k4\), completing the classification. An exact first-difference criterion reduces the problem to comparing a symmetric-polynomial ratio with prime gaps. Explicit estimates for prime-counting functions, certified finite computations, one certified large prime gap, one certified twin prime, and a uniform Chinese-remainder construction then produce, for every \(k4\), a strict descent followed by a later strict ascent.