{ "id": "cond-mat/0009019", "version": "v2", "published": "2000-09-01T21:17:10.000Z", "updated": "2000-09-12T20:16:48.000Z", "title": "Reversible boolean networks II: Phase transition, oscillation, and local structures", "authors": [ "S. N. Coppersmith", "Leo P. Kadanoff", "Zhitong Zhang" ], "comment": "31 pages, 15 figures, 2 tables", "doi": "10.1016/S0167-2789(01)00286-X", "categories": [ "cond-mat.dis-nn", "cond-mat.stat-mech", "math.DS", "nlin.AO", "nlin.CG", "physics.comp-ph" ], "abstract": "We continue our consideration of a class of models describing the reversible dynamics of $N$ Boolean variables, each with $K$ inputs. We investigate in detail the behavior of the Hamming distance as well as of the distribution of orbit lengths as $N$ and $K$ are varied. We present numerical evidence for a phase transition in the behavior of the Hamming distance at a critical value $K_c\\approx 1.65$ and also an analytic theory that yields the exact bounds on $1.5 \\le K_c \\le 2.$ We also discuss the large oscillations that we observe in the Hamming distance for $K