Chaotic B-Spline Curve and Surface Encryption

Version 1.0.0 (7,88 ko) par Lazaros Moysis
Encrypt B-Spline Curves and Surfaces using chaotic systems
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Mise à jour 12 mars 2024

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The code implements the B-Spline curve and surface encryption method proposed in the following work:
Moysis, L., Lawnik, M., Antoniades, I. P., Kafetzis, I., Baptista, M. S., & Volos, C. (2023). Chaotification of 1D maps by multiple remainder operator additions—application to B-spline curve encryption. Symmetry, 15(3), 726.
https://www.mdpi.com/2073-8994/15/3/726
Please cite this work if you use the code below.
The code is broken in sections. Run each section separately using ctr+enter, or by clicking the 'run section' button.
Details about the encryption process are provided in the paper.
The teapot data are available from the following link: https://people.sc.fsu.edu/~jburkardt/data/bezier_surface/bezier_surface.html
Please also cite the link above if you intend to use the data.
The codes for generating the B-spline curves and surfaces are taken from this work: https://www.researchgate.net/publication/329337381_Introduction_to_Computer_Aided_Geometric_Design_-_A_student's_companion_with_Matlab_examples_2nd_Edition
Lazaros Moysis
Youtube channel: https://www.youtube.com/@lazarosmoysis5095
RG: https://www.researchgate.net/profile/Lazaros-Moysis

Citation pour cette source

Lazaros Moysis (2024). Chaotic B-Spline Curve and Surface Encryption (https://www.mathworks.com/matlabcentral/fileexchange/160956-chaotic-b-spline-curve-and-surface-encryption), MATLAB Central File Exchange. Récupéré le .

Compatibilité avec les versions de MATLAB
Créé avec R2023b
Compatible avec toutes les versions
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Remerciements

Inspiré par : Introduction to Computer Aided Geometric Design

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Version Publié le Notes de version
1.0.0