Renormalisable Henon-like Maps and Unbounded Geometry
classification
🧮 math.DS
keywords
geometrymapsrenormalisableunboundedaveragecalledcantordissipative
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We show that given a one parameter family $F_b$ of strongly dissipative infinitely renormalisable H\'enon-like maps, parametrised by a quantity called the `average Jacobian' $b$, the set of all parameters $b$ such that $F_b$ has a Cantor set with unbounded geometry has full Lebesgue measure.
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