A non-uniform distribution property of most orbits, in case the 3x+1 conjecture is true

Abstract

Let T(n)=\arrayll3n+1&(n odd) n2&(n even)array. (n∈ Z). We call "the orbit of the integer n", the set On:=\m∈ Z\;:\;∃ k0,\ m=Tk(n)\ and we put ci(n):=\#\m∈ On\;:\;m i mod.18\. Let W be the set of the integers whose orbit contains 1 and is, in the following sense, about well distributed modulo 18 between the six elements of the set I:=\1,5,7,11,13,17\ (the elements of \1,…,18\ that are odd and not divisible by 3). More precisely: W:=\n∈ N\;:\;∃ k0,\ Tk(n)=1 and ∀ i∈ I,\ ci(n)Σi∈ Ici(n)16+0.0215\. We prove that W has density 0 in N. Consequently, if the 3x+1 conjecture is true, most of the positive integers n satisfy i∈ Ici(n)Σi∈ Ici(n)>16+0.0215.