5.6: Rabbit's show

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Period-n Rabbit Renormalization

You see below the J(-1) set with superattracting period-2 critical orbit. The map f_-₁^o2 is renormalizable (see the right picture below) and z = 0 is its superattracting fixed point, therefore the biggest central red bulb is homeomorphic to J(0) (i.e. a circle).

Next pictures illustrate renormalization of the Douady's rabbit.

"Embedded" Rabbits

c₄ = -1.3125... (in the center of the "secondary" (1/2, 1/2) M-bulb) is periodic point with period 4 . f_c4^o2 is renormalizable (see the picture to the left). The critical point has period 2 under iterations of f_c4^o2, therefore you see a small "embedded" homeomorphic copy of J(-1) in the center of the picture. J(-1) midgets appear in every bulb of "initial" J(-1) set.

f_c4^o4 is renormalizable too (see below) and z = 0 is its superattracting fixed point, therefore the red bulb in the center of J(c4) is a homeomorphic copy of J(0).

In a similar way one can obtain any (^m/_n) bifurcation. E.g. this complex (¹/₃, ¹/₂) J-set is constructed of the two "primary" (¹/₃) and (¹/₂) J-sets.
At last the (¹/₂, ¹/₂, ¹/₂) Rabbit.

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