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Koch snowflake
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==Representation as a de Rham curve== The Koch curve arises as a special case of a [[de Rham curve]]. The de Rham curves are mappings of [[Cantor space]] into the plane, usually arranged so as to form a continuous curve. Every point on a continuous de Rham curve corresponds to a real number in the unit interval. For the Koch curve, the tips of the snowflake correspond to the [[dyadic rational]]s: each tip can be uniquely labeled with a distinct dyadic rational.
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