Iteration Steps of 3x+1 Problem

Abstract

On the 3x+1 problem, given a positive integer N, let D( N ) , O( N ) , E( N ) be the total iteration steps, the odd iteration steps and the even iteration steps when N iterates to 1(except 1) respectively. Trivially, we have D( N ) =O( N ) +E( N ) . In this paper, we propose a so-called weak residue conjecture(i.e., 2E( N )3O( N )· N 2). We prove that if 3x+1 conjecture is true and the weak residue conjecture is true, there exist non-trivial relationships among D( N ) , O( N ) , E( N ) , i.e., O( N ) = 6 2· D( N ) -6 N (it implies that we can calculate O( N ) , E( N ) directly by D( N ) only, of course given N), and 5 more similar equations are derived simultaneously.