Internet Resources for Julia Sets

 

  1. Computer Generated Images of the Julia Set  
    John Hoggard, Math. Dept., Virginia Polytechnic Institute. Blacksburg, VA  
  2. The Julia set  
    Patrik Jansson, Computing Science Dept., Chalmers Univ. of Tech., Gothenburg, Sweden
  3. Julia Set  
    Kevin Hare, Math. Dept., Simon Fraser University, Canada  
  4. The Quaternion Julia Set Tour  
    Lou Kauffman, Electronic Visualization Laboratory,Univ. of Illinois, Chicago, IL
  5. Julia Set  
    Joseph Thomas, Physics Dept., Ohio University, Athens, OH
  6. Mandelbrot and Julia sets  
    Alexander Bogomolny, Cut The Knot!   
  7. Mandelbrot set, Julia set, Periodic Points of Quadratic Polynomials  
    Alexander Bogomolny, Cut The Knot!   
  8. Julia Set  
    Eric Weisstein, World of Mathematics, Wolfram Res., Inc., Champaign, IL   
  9. Fatou Set  
    Eric Weisstein, World of Mathematics, Wolfram Res., Inc., Champaign, IL   
  10. Julia Sets  
    Noel Giffin, Canada's National Laboratory for Particle and Nuclear Physics
  11. Inverse Julia Set  
    James Henstridge, Data Analysis Australia, Perth, Western Australia  
  12. Quaternion Julia Set VRML Server  
    John C. Hart, Computer Science Dept., University of Illinois, Urbana, IL  
  13. Mark's Floating Julia Set Page  
    Mark McClure, Math Dept., Univerisity of North Carolina, Asheville, NC  
  14. The Julia Sets  
    M. Casco Associates, East Stroudsburg, PA  
  15. Julia Set Archive  
    Sandy Antunes, School of Computational Sciences, George Mason Uni., Fairfax, VA  
  16. A "Filled" Julia Set  
    Chip Ross, Math. Dept., Bates College, Lewiston, ME  
  17. Julia set of the Riemann zeta function  
    S. C. Woon, Applied Math. & Theoretical Physics, University of Cambridge, Cambridge, U. K.
  18. Julia Sets  
    Clare Judd, Mathematical Sciences, Univ. of Bath, U. K.  
  19. Some Julia Sets  
    Randall Pyke, Math. Dept, University of Toronto, Ontario, Canada  
  20. Images of Julia Sets  
    Yumei L Dang, Math. Dept., University of Illinois at Chicago, IL   
  21. Julia Set  
    Leonid Zhukov,Department of Computer Science, California Institute of Technology, Pasadena, CA  
  22. Description of the Julia sets of the cabbage fractal  
    Frans Faase, BiZZdesign, University of Twente,  The Netherlands  
  23. A quaternionic Julia set [Un ensemble de Julia dans le corps des quaternions]  
    Jean-Francois Colonna, CMAP/Ecole Polytechnique, Palaiseau Cedex, France
  24. High order Julia set generator  
    Giuseppe Zito, Aleph experiment, Cern, Geneva, Italy  
  25. The Mandelbrot, Julia and Fatou sets  
    Evgeny Demidov, Physics, RAS, Nizhny Novgorod, Russia  
  26. The Mandelbrot Set and Julia Sets  
    Benoit Mandelbrot, Math. Dept., Yale University, New Haven, CT
  27. Julia Sets and the Mandlebrot Set  
    Keith Lynn, Computer Sci., University of South Alabama, Mobile, AL
  28. Mandelbrot set of the Riemann zeta function  
    S. C. Woon, Applied Math. & Theoretical Physics, University of Cambridge, Cambridge, U. K.
  29. Mandelbrot and Julia sets  
    Susan Stepney, Computer Science Dept., University of York,U. K.  
  30. Fractal Geometry  
    Benoit Mandelbrot, Math. Dept., Yale University, New Haven, CT
  31. Fractals and Julia Sets  
    Anne M. Burns, Math. Dept., Long Island University, Brookville, NY  
  32. Making Julia Set Fractals  
    Jeff Berkeley, Lifesmith Classic Fractals, Palmdale, CA
  33. Julia set fractal  
    Paul Bourke, Astrophysics and Supercomputing, Swinburne Univ. of Tech., Victoria, Australia  
  34. Sprott's Fractal Gallery  
    Julien Clinton Sprott, Physics Dept., University of Wisconsin, Madison, WI
  35. Replicating the "Fractal Zoom" in Three Physical Dimensions   
    Stewart Dickson, Computer Science & Math. Div., Oak Ridge National Lab., Oak Ridge, TN   
  36. The Fractal Microscope  
    National Center for Supercomputing Applications, Univ. of Illinois Board of Trustees  
  37. 3-D Visualization of Julia Sets and Other Fractals  
    Christian Anders Cumbaa, Computer Science Dept., University of Waterloo,  Canada  
  38. Conditions for the Julia set of a self map of P to be Uniformly Repelling PDF  
    John W. Robertson, Math. Dept., University of Toronto, Ontario, Canada  
  39. Julia Set  
    JohnTrout, Math. Dept., Dartmouth College, Hanover, NH  
  40. The Mandelbrot Set and Julia Sets  
    Math. Sciences Dept., Binghamton University, SUNY, Binghamton, NY  
  41. The Mandelbrot/Julia Set applet  
    James Denvir  
  42. Classic Mandelbrot/Julia Set applet  
    James Henstridge, Data Analysis Australia, Perth, Western Australia  
  43. Julia and Mandelbrot Set Generation  
    David E. Joyce, Math. Dept., Clark University,Worcester, MA  
  44. Julia and Mandelbrot Set Explorer  
    David E. Joyce, Math. Dept., Clark University,Worcester, MA  
  45. Mandelbrot set and Julia sets: Java applet  
    Rick Moeckel, Math. Dept., University of Minnesota Minneapolis, MN  
  46. Java Julia Set Generator  
    Mark McClure, Math Dept., Univerisity of North Carolina, Asheville, NC  

 

 

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(c) John H. Mathews 2003