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Dynamical Properties of the Derivative of the Weierstrass Elliptic Function

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Published as:Goldsmith, Jeff and Lorelei Koss. Dynamical Properties of the Derivative of the Weierstrass Elliptic Function. Involve 2, no. 3 (2009): 267-88.For more information on the published version, visit Mathematical Sciences Publisher's Website.

We discuss properties of the Julia and Fatou sets of the derivative of the Weierstrass elliptic ℘ function. We find triangular lattices for which the Julia set is the whole sphere, or which have superattracting fixed or period two points. We study the parameter space of the derivative of the Weierstrass elliptic function on triangular lattices and explain the symmetries of that space.

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MLA citation style (9th ed.)

Koss, Lorelei, and Goldsmith, Jeff. Dynamical Properties of the Derivative of the Weierstrass Elliptic Function. . 2009. dickinson.hykucommons.org/concern/generic_works/27bae413-51f2-42a0-9819-ed77f3d86c6f.

APA citation style (7th ed.)

K. Lorelei, & G. Jeff. (2009). Dynamical Properties of the Derivative of the Weierstrass Elliptic Function. https://dickinson.hykucommons.org/concern/generic_works/27bae413-51f2-42a0-9819-ed77f3d86c6f

Chicago citation style (CMOS 17, author-date)

Koss, Lorelei, and Goldsmith, Jeff. Dynamical Properties of the Derivative of the Weierstrass Elliptic Function. 2009. https://dickinson.hykucommons.org/concern/generic_works/27bae413-51f2-42a0-9819-ed77f3d86c6f.

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

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