New results on the stopping time behaviour of the Collatz 3x + 1 function

Abstract

Let σn=1+n·23. For the Collatz 3x + 1 function exists for each n∈N a set of different residue classes (mod\ 2σn) of starting numbers s with finite stopping time σ(s)=σn. Let zn be the number of these residue classes for each n≥0 as listed in the OEIS as A100982. It is conjectured that for each n≥4 the value of zn is given by the formula align* zn=(m+n-2)!m!·(n-2)!-Σi=2n-13(n-i)+δ2n-i· zi, align* where m=(n-1)·23-(n-1) and δ∈Z assumes different values within the sum at intervals of 5 or 6 terms. This allows us to create an iterative algorithm which generates zn for each n>6.