Books on the topic 'Mandelbrot sets'
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Consult the top 19 books for your research on the topic 'Mandelbrot sets.'
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Lesmoir-Gordon, Nigel. The colours of infinity: The beauty and power of fractals. London: Springer Verlag, 2010.
Mandelbrot, Benoit B. Fractals and chaos: The Mandelbrot set and beyond. New York, NY: Springer, 2004.
Tomboulian, Sherryl. Indirect addressing and load balancing for faster solution to Mandelbrot Set on SIMD architectures. Hampton, Va: ICASE, 1989.
Banaś, Marian. Analiza teoretyczna i badania właściwości zawiesin nieziarnistych w zastosowaniu do projektowsnia i eksploatacji wielostrumieniowych urządzeń sedymentacyjnych: Theoretical analysis and investigations of the properties of the non-grainy suspensions in terms to design and use of the lamella settling devices. Kraków: Wydawnictwa AGH, 2012.
Devaney, Robert, ed. Complex Dynamical Systems: The Mathematics Behind the Mandelbrot and Julia Sets. Providence, Rhode Island: American Mathematical Society, 1995. http://dx.doi.org/10.1090/psapm/049.
Dang, Yumei. Hypercomplex iterations: Distance estimation and higher dimensional fractals. River Edge, NJ: World Scientific, 2002.
AMS-IMS-SIAM Joint Summer Research Conference on Complex Dynamics: Twenty-five Years after the Appearance of the Mandelbrot Set (2004 Snowbird, Utah). Complex dynamics: Twenty-five years after the appearance of the Mandelbrot set : proceedings of an AMS-IMS-SIAM Joint Summer Research Conference on Complex Dynamics--Twenty-five Years after the Appearance of the Mandelbrot Set, June 13-17, 2004, Snowbird, Utah. Edited by Devaney Robert L. 1948- and Keen Linda. Providence, R.I: American Mathematical Society, 2006.
Milnor, John W. Dynamical systems (1984-2012). Edited by Bonifant Araceli 1963-. Providence, Rhode Island: American Mathematical Society, 2014.
Furstenberg, Harry. Ergodic theory and fractal geometry. Providence, Rhode Island: Published for the Conference Board of the Mathematical Sciences by the American Mathematical Society, 2014.
Silverman, Joseph H. Moduli spaces and arithmetic dynamics. Providence, R.I: American Mathematical Society, 2012.
Tan, Lei. The Mandelbrot Set, Theme and Variations. Cambridge University Press, 2000.
Mandelbrot, Benoit B. Fractals and Chaos: The Mandelbrot Set and Beyond. Springer, 2004.
1948-, Devaney Robert L., and Branner Bodil, eds. Complex dynamical systems: The mathematics behind the Mandelbrot and Julia sets. Providence, R.I: American Mathematical Society, 1994.
Devaney, Robert. The Mandelbrot and Julia Sets (The Tool Kit of Dynamic Activities). Key Curriculum, 2003.
The colours of infinity: The beauty and power of fractals. [S.l.]: Clear Books, 2004.
Frame, Michael. Fractal worlds: Grown, built, and imagined. 2016.
Urry, Amelia, and Michael Frame. Fractal Worlds: Grown, Built, and Imagined. Yale University Press, 2016.
Morozov, A., and V. Dolotin. Universal Mandelbrot Set: Beginning of the Story. World Scientific Publishing Company, 2006.
Alt.Fractals: A visual guide to fractal geometry and design. Brighton, Uk: Chocolate Tree Books, 2011.