Discrete Velocity of non-attracting Basins and Petals by Chris King.Triangle Inequality Average Coloring = TIA and curvature average algorithm ( CAA).Average Colorings "are a family of coloring functions that use the decimal part of the smooth iteration count to interpolate between average sums." Jussi Harkonen.Boettcher map, complex potential and external ray.Maping component to the unit disk ( Riemann map ):.external ray ( parameter and dynamic) trace.unroll a closed curve and then stretch out into an infinite strip.Inverse iteration method ( IIM) for drawing:.Decomposition of the target set: Binary Decomposition Method ( BDM) which in parabolic case gives: zeros of Qn or parabolic checkerboard ( chessboard).escape and attracting time for (level sets method (LSM), level curves method (LCM).How to construct map with desired properities ?Īlgorithms: Algorithms, methods of drawing/computing or representation finctions ( for space transformations see here).periodic points of complex quadratic map.Iterations : forward and backward ( inverse ) and critical orbit.Programming computer graphic: files, plane, transformations, curves.Mathematics for computer graphic: numbers, sequences, functions, numerical methods, fields.2.2.1.1.2 Complex quadratic polynomials.Some believe that, due to their highly complex and mysterious nature, the greatest use of fractals is yet to be discovered. Deeper still you would find quarks, neutrinos and so on and then, just maybe, continuously deeper into infinity. And inside of those you would find DNA Inside DNA you would find atoms, electrons, protons, neutrons. And inside of that human you would find a brain made of millions of cells in which you would find trillions of synapses firing away. On Earth you would find continents, cities and a human. And on one of those planets you would find Earth. Inside of those galaxies, you would find trillions of stars and billions of solar systems and planets. It's even believed by some that the universe itself may be a fractal and as you zoomed in you would discover it's made up of billions of galaxies. For example, research into climate change and the trajectory of dangerous meteorites, helping with cancer research by helping to identify the growth of mutated cells. Fractal geometry is currently applied in many fields. One of the most amazing things about the Mandelbrot set is that theoretically, if left by itself, would continue to create infinitely new patterns from the original structure proving that something could be magnified forever. This would become known as the Mandelbrot set an infinite geometrical visualisation of a fractal. This process led him to a breakthrough equation combining the patterns found in previous monsters resulting in his own set of numbers. Mandelbrot used the modern computing powers developed by IBM to run these monster equations millions of times over. Experiments such as Georg Cantor's discovery that a single line could be divided forever and Helge von Koch's triangle a shape that has an infinite perimeter but a finite area resulted in the term 'monsters'. Mandlebrot had been fascinated by discoveries of mathematicians from the early 19th Century who were attempting to define their understanding of what a curve is. The term fractal was coined by Benoit Mandelbrot who was working at computer giant IBM in 1980. It's often said that no two snowflakes are ever the same and fractals offer a fascinating explanation as to why nature works in this way, why nature continuously creates new, self-replicating yet unique structures and how the smallest things in existence are necessary components of the greater whole. So cut off one piece and you're left with a smaller version of the entire broccoli. A classic example of a fractal in nature is broccoli in that the whole stalk is a similar version of one of its branches. NARRATOR: What do galaxies, cloud formations, your nervous system, mountain ranges and coastlines all have in common? They all contain never ending patterns known as fractals. The freaky world of never-ending fractals
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