Frequency Ordered Ratio Families Arising from the Factorization of pm-1+1

Abstract

We investigate a ratio sequence derived from the factorization of pm-1 + 1, where pn denotes the nth prime. For each m ≥ 3, write pm-1 + 1 = Lm Rm with Lm the largest prime factor. Restricting to those m for which Lm > m (equivalently, m ∈ A223881), we obtain a multiset of values Rm. Since pm-1+1 is even and Lm > 3 is odd, all values of Rm are strictly even. Sorting the distinct Rm by decreasing frequency yields a new sequence beginning 2, 6, 4, 8, 10, 12, 14, 16 …. This article explains how this construction arises naturally from the structure of A223881, why the ``family'' phenomenon appears in plots of pm-1 + 1, and how the frequency ordering of Rm captures the dominant families. Additionally, we propose a heuristic asymptotic model explaining the observed frequency ordering via classical results on primes in arithmetic progressions and support the model with numerical log-log analysis.