Paper Titles
The Weighted Error Estimation of Finite Element Method for Two-Point Boundary Value Problem
p.1571
Studies on the Thermal Decomposition Kinetic of an Nitrate Ester
p.1575
Nonlinear Analysis of Two Shear Walls Using Elastic Plastic Damage Model
p.1581
Finite Element Method in the Research on the Application of Contact Deformation
p.1585
Construction of Planar Dynamic Systems with Function of Non-Linear Angle Variables
p.1590
The Load Analysis of Chisel-Edge Ruling Tool for Diffraction Gratings
p.1596
The Parameter Inversion and Stress Simulation Analysis for High RCC Gravity Dam in Construction
p.1600
Study on Blank Holder Force Control in Sheet Metal Forming Process
p.1605
Nonlinear Stability Analysis for Schwedler Reticulated Dome
p.1609

Construction of Planar Dynamic Systems with Function of Non-Linear Angle Variables

Article Preview

Abstract:

This paper constructs the planar dynamic systems with non-equidistant cyclic windows. To generate planar tiling images with different visual effects by the same iterative mapping, we propose a method that allows the planar tessellations to be constructed by a planar dynamic system with non-equidistant cyclic windows. A family of iterative mappings are constructed which generate cyclic windows of variant size in the dynamic plane by incorporating cosine functions and non-linear angle variables with the same parameters. Filled-in Julia sets in different cyclic windows are created by generating the coordinates of any cyclic windows. The images in different windows are continuous but with individual structures. We can choose any cyclic windows as the basic computing region and stretch or compress it into a square, which is transferred to the plane to compose the planar tilling. Experimental results show the effectiveness of the proposed approach.

You might also be interested in these eBooks
Applied Mechanics and Mechatronics Automation View Preview

Info:

Periodical:

Applied Mechanics and Materials (Volumes 182-183)

Pages:

1590-1595

DOI:

https://doi.org/10.4028/www.scientific.net/AMM.182-183.1590

Citation:

Cite this paper

Online since:

June 2012

Authors:

Yan Ling Sun, Li Zheng, Jing Hou

Keywords:

Dynamic Systems, Filled-In Julia Set, Non-Equidistance Cyclic Windows, Nonlinear Iterative Mapping

Export:

RIS, BibTeX

Price:

Permissions CCC:

Request Permissions

Permissions PLS:

Request Permissions

Сopyright:

© 2012 Trans Tech Publications Ltd. All Rights Reserved

Share:

Citation:

References

[1] Zhu W Y, Zhu Z L, Liu X D, et al., A series conjectures of M-J chaos fractal image constructi -on by the periodic buds Fibonacci Sequence, Chinese Journal of Computers, vol. 26(2), pp.221-226, (2003).

Google Scholar

[2] Chen N, Zhu W Y, Bud-sequence conjecture on M fractal image and M-J conjecture between c and z planes from , Computers & Graphics, vol. 22(4), pp.537-546, (1998).

DOI: 10.1016/s0097-8493(98)00051-x

Google Scholar

[3] Escher M C. , Escher on Escher : Exploring the Infinite, New York: Harry N. Abrams, (1989).

Google Scholar

[4] Field M and Golubitsky M, Symmetry in Chaos, Oxford University Press. New York: Oxford University Press, (1992).

Google Scholar

[5] Armstrong A M, Groups and Symmetry, New York: Springer, (1998).

Google Scholar

[6] Carter N C, Eagles R L, Grimes S M, et al. , Chaotic attractors with discrete planar symmetries, Chaos Solitions and Fractals, vol. 9(12), pp.2031-2054, (1998).

DOI: 10.1016/s0960-0779(97)00157-4

Google Scholar

[7] Lu J, Ye Z X and Zou Y R, Orbit trap tendering methods for generationg artistic images with crystallographic symmetries, Computers & Graphics, vol. 29(5), pp.787-794, (2005).

DOI: 10.1016/j.cag.2005.08.008

Google Scholar

[8] Chung K W, Ma H M, Automatic generation of aesthetic patterns on fractal tilings by means of dynamical systems, Chaos, Solitons and Fractals, vol. 24(4), pp.1145-1158, (2005).

DOI: 10.1016/j.chaos.2004.09.115

Google Scholar

[9] Clifford A Reiter, Fractals, Visualization and J 3rd ed. , Lulu: Toronto: Jsoftware, Inc., (2007).

Google Scholar

[10] Sprott J C. Automatic generation of strange attractors, Computers & Graphics, vol. 17(3), pp.325-332, (1993).

DOI: 10.1016/0097-8493(93)90082-k

Google Scholar

[11] Chen N, Meng F Y, Critical points and dynamic systems with planar hexagonal symmetry, Chaos, Solitons&Fractals, vol. 32(2), p.1027~1037, (2007).

DOI: 10.1016/j.chaos.2006.03.062

Google Scholar

[12] Chen N, Li Z C and Jin Y Y, Visual presentation of dynamic systems with hyperbolic planar symmetry, Chaos, Solitons & Fractals, vol. 40(2),pp.621-634, (2009).

DOI: 10.1016/j.chaos.2007.08.020

Google Scholar

[13] Chen N, Sun J, Sun Y L, et al., Visualizing the complex dynamics of families of polynomials, Chaos, Solitons & Fractals, vol. 42(3), pp.1611-1622, (2009).

DOI: 10.1016/j.chaos.2009.03.042

Google Scholar

[14] Chen N, Sun Y L, Sun J, Construction of dynamic system with P1 plane symmetry from the mapping with transformable fundamental region, Journal of Shen Yang JianZhu University Natural Science, vol. 24(6), pp.1099-1102, (2008).

Google Scholar