There are no Collatz-m-Cycles with m≤ 91

Abstract

The Collatz conjecture (or ``Syracuse problem'') considers recursively-defined sequences of positive integers where n is succeeded by n2, if n is even, or 3n+12, if n is odd. The conjecture states that for all starting values n the sequence eventually reaches the trivial cycle 1, 2, 1, 2, … . We are interested in the existence of nontrivial cycles. Let m be the number of local minima in such a nontrivial cycle. Simons and de Weger proved that m ≥ 76. With newer bounds on the range of starting values for which the Collatz conjecture has been checked, one gets m ≥ 83. In this paper, we prove m ≥ 92. The last part of this paper considers what must be proven in order to raise the number of odd members a nontrivial cycle has to have to the next bound -- that is, to at least K≥1.375· 1011. We prove that it suffices to show that, for every integer smaller than or equal to 1536·260=3·269, the respective Collatz sequence enters the trivial cycle. This reduces the range of numbers to be checked by nearly 60\%.