Prime-Power Rarefaction and a Density-One Lower Bound for Erdős Problem 400

Abstract

For fixed k 2, let gk(n) be the greatest excess a1+·s+ak-n among positive integers ai satisfying a1!·s ak! n!. We prove that, for every >0, all but o(x) integers n x satisfy \[ gk(n) (3(k-1) 12-) n. \] We also prove, as n∞, the pointwise upper bound \[ gk(n) (k-1)2 n+2 n+Ok(1). \] The central analytic input is uniform phase separation for one or two frequencies on fixed-prime S-unit progressions, deduced directly from the finite exceptional-subspace alternative of Drmota and Spiegelhofer, and the resulting uniform digit-sum normal-order theorem. A mixed 2--3 representation, quantitative two-block estimates, and a large-prime Kummer sieve produce the stated coefficient.