Generated in the year 2000, this is the first picture of the Tetrabrot used in a secondary source. Reference: "Du relief pour les fractales," Dossier Pour la Science, Nº 91 Avril-Juin 2016, P. 52.
In multicomplex dynamics, the "Tetrabrot" is an algebraic and analytical generalization of the Mandelbrot set. Discovered by Prof. Dominic Rochon in 2000 (Fractals, 8(4):355-368), it can be interpreted as one of the eight principal 3D slices of the tricomplex Mandelbrot set.
The Mandelbrot set has its place in complex dynamics, a field first investigated by the French mathematicians Pierre Fatou and Gaston Julia at the beginning of the 20th century. This fractal was first defined and drawn in 1978 by Robert W. Brooks and Peter Matelski as part of a study of Kleinian groups. The Mandelbrot set is known as one of the most popular fractal sets in modern mathematics.
Tetrabrot - Dossier Pour la Science Nº 91
- PriceUSD PriceQuantityExpirationFrom
- PriceUSD PriceQuantityFloor DifferenceExpirationFrom
Tetrabrot - Dossier Pour la Science Nº 91
- PriceUSD PriceQuantityExpirationFrom
- PriceUSD PriceQuantityFloor DifferenceExpirationFrom
Generated in the year 2000, this is the first picture of the Tetrabrot used in a secondary source. Reference: "Du relief pour les fractales," Dossier Pour la Science, Nº 91 Avril-Juin 2016, P. 52.
In multicomplex dynamics, the "Tetrabrot" is an algebraic and analytical generalization of the Mandelbrot set. Discovered by Prof. Dominic Rochon in 2000 (Fractals, 8(4):355-368), it can be interpreted as one of the eight principal 3D slices of the tricomplex Mandelbrot set.
The Mandelbrot set has its place in complex dynamics, a field first investigated by the French mathematicians Pierre Fatou and Gaston Julia at the beginning of the 20th century. This fractal was first defined and drawn in 1978 by Robert W. Brooks and Peter Matelski as part of a study of Kleinian groups. The Mandelbrot set is known as one of the most popular fractal sets in modern mathematics.