On Collatz Conjecture

Abstract

The Collatz Conjecture can be stated as: using the reduced Collatz function C(n) = (3n+1)/2x where 2x is the largest power of 2 that divides 3n+1, any odd integer n will eventually reach 1 in j iterations such that Cj(n) = 1. In this paper we use reduced Collatz function and reverse reduced Collatz function. We present odd numbers as sum of fractions, which we call `fractional sum notation' and its generalized form `intermediate fractional sum notation', which we use to present a formula to obtain numbers with greater Collatz sequence lengths. We give a formula to obtain numbers with sequence length 2. We show that if trajectory of n is looping and there is an odd number m such that Cj(m) = 1, n must be in form 3j×2k + 1, k ∈ N0 where Cj(n) = n. We use Intermediate fractional sum notation to show a simpler proof that there are no loops with length 2 other than trivial cycle looping twice. We then work with reverse reduced Collatz function, and present a modified version of it which enables us to determine the result in modulo 6. We present a procedure to generate a Collatz graph using reverse reduced Collatz functions.