Scaling and ordering at the interior crisis points

You see below bifurcation diagram, three chaotic bands and three g_3n, g_3n+1, g_3n+2 (n = 0,1,2...) bunches near the interior crisis point of period-3 window.

As we know, the central band is similar to the whole bifurcation diagram. Therefore by composition of the period-3 window pattern CLR (corresponding to its superstable orbit) and the "parent" sequence CLRⁿ we obtain
CLR²LR, CLR²(LRL)LR, CLR²(LRL)²LR, ... , CLR²(LRL)ⁿLR ... .
These CLR²(LRL)ⁿLR orbits with periods 6, 9, 12 ... converge (from the right) to the preperiodic point tip(CLR) = [CLR²]LRL on the pictures below. The orbits are placed at the roots of g_3n(c) = 0 (intersections of the central bunche g_3n(c) = 0 with x = 0) near the interior crisis point.

Roots of g_3n+1(c) = 0 and g_3n+2(c) = 0 are the intersections of the left and the right bunches with x = 0 (after the crisis point). Corresponding sequences of periodic orbits (and tiny M-sets) CLR²(LRL)ⁿ and CLR²(LRL)ⁿL with periods 4, 7, 10... and 5, 8, 11... go to the tip from the left. They form self-similar pattern near the tip.

You see period-10 window and period-12 CLR²(LRL)²LR , period-10 CLR²(LRL)² and period-11 CLR²(LRL)²L critical orbits. Points of "intermittent" orbits jump consequently between three g_n(c) bunches.

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updated 17 November 2002