A Fixed-Prime Criterion for Reciprocals in Missing-Digit Sets

Abstract

We prove a structural upper bound on the p-adic valuation of denominators of rationals belonging to a missing-digit set Km,D, generalizing a key step in recent work of Lin, Wu, and Yang [arXiv:2603.24614] on reciprocals of factorials. For a rational rQ with (Q,m)=1 and a fixed prime p0 m, membership in Km,D forces p0(Q) to be controlled by the p0-adic valuation of the multiplicative order of m modulo the radical of Q, with explicit overhead depending only on m and D. Because the obstruction is stated at the level of a single denominator, a pair of sequence-specific valuation estimates converts it into an effective finiteness criterion for \1an:n∈N\ Km,D. Specializing to the case in which Q is the part of n! coprime to m recovers the fixed-prime step in the Lin--Wu--Yang argument. As applications, we treat reciprocals of superfactorials, products of polynomial values, and products of Fibonacci numbers. We also exhibit an exponential family -- products of (mk-1) -- for which the full structural criterion applies but a coarser largest-prime-factor formulation does not.