Level Totients for Integer Mosaics

Abstract

We study a level analog of Euler's totient function for integer mosaics. Let Pi(n) be the set of primes appearing in the first i levels of the mosaic of n, and let φi(n) count the integers m≤ n for which Pi(m) Pi(n)=. We prove a Möbius divisor-sum formula for φi(n) and reduce it to a sum over a set Vi,S of powerful integers. If S≠, i≥ 2, and q= S, then \[ |Vi,S[1,x]| Ci,Sx1/q, \] with Ci,S an explicit positive Euler-product constant. For fixed S, the density δi(S) of integers whose first i levels avoid S exists and has an Euler product; for nonempty S, i2, and q= S, the number of such integers up to N is δi(S)N+Oi,S(N1/q). Taking S=Pi(n) gives \[ φi(n)n=δi(Pi(n))+O(n-1/2+) \] uniformly in n.