The 3x+1 Periodicity Conjeture in R
Abstract
The 3x+1 map T is defined on the 2-adic integers Z2 by T(x)=x/2 for even x and T(x)=(3x+1)/2 for odd x. It is still unproved that under iteration of T the trajectory of any rational 2-adic integer is eventually cyclic. A 2-adic integer is rational if and only if its representation with 1's and 0's is eventually periodic. We prove that the 3x+1 conjugacy maps aperiodic v∈Z2 onto aperiodic 2-adic integers provided that \;(h)=1∞ > (2)(3) where h is the number of 1's in the first digits of v with the following constraint: if there is a rational 2-adic integer with a non-cyclic trajectory, then necessarily \;(h)=1∞=(2)(3). We study as an infinite series in R and obtain negative irrational numbers for which we compute their aperiodic 2-adic expansion. We find prominent behaviors of the orbit of x taking Sturmian words as parity vector. We also found amazing results of the terms of in R. We define the 'th iterate of T for → ∞ in the ring of 3-adic integers and obtain positive irrational numbers for which we compute their aperiodic 3-adic expansion.
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