Geometric Modelling of General Sierpinski Fractals Using Iterated Function System in Matlab

Study on properties of general Sierpinski fractals, including dimension, measure, Lipschitz equivalence, etc is very interesting. Like other fractals, general Sierpinski fractals are so complicated and irregular that it is hopeless to model them by simply using classical geometry objects. In [22], the authors the geometric modelling of a class of general Sierpinski fractals and their geometric constructions in Matlab base on iterative algorithm for the purpose of studying fractal theory. In this paper, we continue such investigation by adding certain rotation structure and obtain some results by extending our approaches to three dimensional space. Our results may be used for any graphical goal, not only for mathematical reasons.

[1]  K. Lau,et al.  Topological structure of fractal squares , 2012, Mathematical Proceedings of the Cambridge Philosophical Society.

[2]  Li Feng,et al.  A new estimate of the Hausdorff measure of the Sierpinski gasket , 2000 .

[3]  Stephen Semmes,et al.  Fractured fractals and broken dreams : self-similar geometry through metric and measure , 1997 .

[4]  Zhifeng Zhu,et al.  Lipschitz equivalence of fractal triangles , 2016 .

[5]  K. Falconer Techniques in fractal geometry , 1997 .

[6]  Slawomir Nikiel,et al.  True-colour images and iterated function systems , 1998, Comput. Graph..

[7]  Zhiyong Zhu Simulation of Sierpinski-type fractals and their geometric constructions in Matlab environment , 2013 .

[8]  Lifeng Xi,et al.  DIMENSIONS OF INTERSECTIONS OF THE SIERPINSKI CARPET WITH LINES OF RATIONAL SLOPES , 2007, Proceedings of the Edinburgh Mathematical Society.

[9]  Zhifeng Zhu LIPSCHITZ EQUIVALENCE OF TOTALLY DISCONNECTED GENERAL SIERPINSKI TRIANGLES , 2015 .

[10]  M. Barnsley,et al.  Iterated function systems and the global construction of fractals , 1985, Proceedings of the Royal Society of London. A. Mathematical and Physical Sciences.

[11]  Lifeng Xi,et al.  Lipschitz equivalence of self-similar sets with triangular pattern , 2011 .

[12]  Ankit Garg,et al.  Geometric Modelling Of Complex Objects Using Iterated Function System , 2014 .

[13]  Baoguo Jia Bounds of Hausdorff measure of the Sierpinski gasket , 2007 .

[14]  Zhi-Xiong Wen,et al.  Lipschitz equivalence of a class of general Sierpinski carpets , 2012 .

[15]  E. W. Jacobs,et al.  Fractal Image Compression Using Iterated Transforms , 1992 .

[16]  Deng Fang,et al.  An application of L-system and IFS in 3D fractal simulation , 2008 .

[17]  Wang Hao-peng Research on dynamic simulation method of plants based on arithmetic of IFS , 2005 .

[18]  Kenneth Falconer,et al.  Fractal Geometry: Mathematical Foundations and Applications , 1990 .

[19]  Proceedings of the Edinburgh Mathematical Society , 1893 .

[20]  Lifeng Xi,et al.  Self-similar sets with initial cubic patterns , 2010 .

[21]  Wenxia Li,et al.  A generalized multifractal spectrum of the general Sierpinski carpets , 2008 .