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One-Sided Lebesgue Bernoulli Maps of the Sphere of Degree n² and 2n²

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We prove that there are families of rational maps of the sphere of degree n2 (n = 2,3,4,...) and 2n2 (n = 1,2,3,...) which, with respect to a finite invariant measure equivalent to the surface area measure, are isomorphic to one-sided Bernoulli shifts of maximal entropy. The maps in question were constructed by Böettcher (1903–1904) and independently by Lattès (1919). They were the first examples of maps with Julia set equal to the whole sphere.

Barnes, Julia A. and Lorelei Koss. One-Sided Lebesgue Bernoulli Maps of the Sphere of Degree n² and 2n². International Journal of Mathematics and Mathematical Sciences 23, no. 6 (2000): 383-92.

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  • International Journal of Mathematics and Mathematical Sciences

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MLA citation style (9th ed.)

Barnes, Julia A, and Koss, Lorelei. One-sided Lebesgue Bernoulli Maps of the Sphere of Degree N² and 2n². . 2000. dickinson.hykucommons.org/concern/generic_works/bc8d0ee8-2c48-4c35-8bb9-e30aae855f0a.

APA citation style (7th ed.)

B. J. A, & K. Lorelei. (2000). One-Sided Lebesgue Bernoulli Maps of the Sphere of Degree n² and 2n². https://dickinson.hykucommons.org/concern/generic_works/bc8d0ee8-2c48-4c35-8bb9-e30aae855f0a

Chicago citation style (CMOS 17, author-date)

Barnes, Julia A., and Koss, Lorelei. One-Sided Lebesgue Bernoulli Maps of the Sphere of Degree N² and 2n². 2000. https://dickinson.hykucommons.org/concern/generic_works/bc8d0ee8-2c48-4c35-8bb9-e30aae855f0a.

Note: These citations are programmatically generated and may be incomplete.

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