The Application of Fractal Theory in Graphics Design

Lin Kang; Cheng Mao Li

doi:10.4028/www.scientific.net/AMR.267.1075

Paper Titles

Efficient Mobile Anchor Point Messaging Assumption in IPv6 Based Wireless Mobile Networks
p.1038

Office System Design and Implementation Based on B/S
p.1044

Application of an Improved Attribute Reduction Algorithm in Diabetic Complication Diagnosis
p.1048

Application of Rough Set Feature Selection in the Hazard Assessment of Debris Flow
p.1051

A Semantics Based Routing Scheme for Cloud Computing
p.1054

A Passive Circuit Based RF Optimization Methodology for Wireless Sensor Network Nodes
p.1059

A Co-Training Based Semi-Supervised Human Action Recognition Algorithm
p.1065

Intelligent Expert System of Garment Workstage Synchronizing
p.1071

The Application of Fractal Theory in Graphics Design
p.1075

HomeAdvanced Materials ResearchAdvanced Materials Research Vol. 267The Application of Fractal Theory in Graphics...

The Application of Fractal Theory in Graphics Design

Abstract:

Fractal theory is a new subject produce and developed in recent decades, belongs to the category of nonlinear science, still in the process of development and improvement. Its appearance break through the understanding in the scope of Euclidean geometry, it provides a good explanation of phenomenon that cannot be solved by European Geometry, enable people to know something more accurately. So arouse universal attention in natural science and social science, it has been widely used in mathematics, physics, chemistry, material science, biology and medicine, geological and astronomy, geography, earthquakes and computer science, etc.

You might also be interested in these eBooks

Manufacturing Systems and Industry Application

View Preview

Info:

Periodical:

Advanced Materials Research (Volume 267)

Pages:

1075-1080

DOI:

https://doi.org/10.4028/www.scientific.net/AMR.267.1075

Citation:

Cite this paper

Online since:

June 2011

Authors:

Lin Kang, Cheng Mao Li

Keywords:

Computer Graphics Design, Fractal Dimension, Fractal Theory

Export:

RIS, BibTeX

Price:

Permissions CCC:

Request Permissions

Permissions PLS:

Request Permissions

Сopyright:

Citation:

References

[1] Mobasher B, Cooley R, Jaideep S, etal. Study on the fractal graph based on fractal theory, New York: IEEE Press, (1999).

Google Scholar

[2] Shahabi C, Zarkesh A M, Adibi J, et al. Design and Implementation of Fractal theory.

Google Scholar

[3] Yan T, JacobesnM, Garcia-Mo Lina H, Research and Modification of TinyOS in Wireless Sensor Networks. [C]. : Paris WAM Press, (1999).

Google Scholar

[4] Xu L. Applications of Fractal Theory to Urban Studies. Alaska: Anchorage Press, (2001).

Google Scholar

[5] Bezdek J C. Application of fault fractal theory, Co rnell University, Ithaca, N ew York, (2001).

Google Scholar

[6] KamelM and Selim S Z. Basic knowledge based on fractal theory. 1994, 27 (3) : 421̚ 428.

Google Scholar

[7] Zadeh L A. Fuzzy sets. Implementation of Software development platform based on VB6. 0. 2001, 8: 338 ̚ 353.

Google Scholar

[8] KamelM and Selim S Z. Newton iteration fractal 2002, 61: 177̚~188.

Google Scholar

[9] A l- Sultan K S and Selim S Z. An Integrated Development Classical fractal images. 2002, 26 (9) : 1357-1361.

Google Scholar

[10] M iyamo to S and N akayama K. Analysis on Fractal tree generation. IEEE T rans. System M an. Cybernet. 1986, 16 (3) : 479̚ 482.

Google Scholar

[11] Bezdek J C, Hathaway R, SabinM and TuckerW. Transplant of Fractal graphics savedCybernet. 1987, 17 (5) : 873̚877.

Google Scholar

[12] KameciM and Selina S Z. Analysis of Fractal image processing. 1994, 27 (3) : 421̚ 428.

Google Scholar

[13] JamelM and Salim S Z. Development and Design of Worked fractal image save. 2005, 61: 177̚ 188.

Google Scholar

[14] A l- Susan K S and Selim S Z. The scope of application of fractal graph 2007, 26 (9) : 1357̚ 1361.

Google Scholar

[15] Meyanmo to S and N akayama K. Realization of computer logic language and artistic form. IEEE.

Google Scholar