The Collatz Problem generalized to 3x+k
Abstract
The Collatz problem with 3x+k is revisited. Positive and negative limit cycles are given up to k=9997 starting with x0=-2·107...+2·107. A simple relation between the probability distribution for the Syracuse iterates for various k (not divisible by 2 and 3) is obtained. From this it follows that the oscillation considered by Tao 2019 ( arXiv:1909.03562v2 ) does not depend on k. Thus this piece of the proof of his theorem 1.3 "Almost all Collatz orbits attain almost bounded values" holds for all k not divisible by 2 and 3.
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