CLC number: TP37
On-line Access: 2020-12-10
Received: 2020-05-20
Revision Accepted: 2020-09-21
Crosschecked: 2020-10-29
Cited: 0
Clicked: 4269
Citations: Bibtex RefMan EndNote GB/T7714
Xiao-ling Huang, You-xia Dong, Kai-xin Jiao, Guo-dong Ye. Asymmetric pixel confusion algorithm for images based on RSA and Arnold transform[J]. Frontiers of Information Technology & Electronic Engineering,in press.https://doi.org/10.1631/FITEE.2000241 @article{title="Asymmetric pixel confusion algorithm for images based on RSA and Arnold transform", %0 Journal Article TY - JOUR
基于RSA和Arnold变换的非对称图像混淆算法广东海洋大学数学与计算机学院,中国湛江市,524088 摘要:提出一种新的基于Rivest-Shamir-Adleman(RSA)公钥密码系统和Arnold映射的非对称像素混淆算法。首先,为解决Arnold映射参数对称分布问题,采用RSA非对称算法生成两组Arnold映射变换参数。其次,将图像分成图像块,并利用第一组参数对各图像块进行Arnold混淆。然后,使用第二组参数对整个图像进行Arnold混淆。从而,充分削弱图像相关性,进一步提高图像混淆程度和效果。试验结果表明,相比于基于经典Arnold映射混淆和基于行列交换混淆,本文所提图像像素混淆算法具有更好混淆效果。具体来说,灰度差的值均接近于0。另外,新的混淆操作安全性依赖于RSA,可作为密码学中混淆-替换结构的一部分。 关键词组: Darkslateblue:Affiliate; Royal Blue:Author; Turquoise:Article
Reference[1]Abbas NA, 2016. Image encryption based on independent component analysis and Arnold’s cat map. Egypt mboxInform J, 17(1):139-146. [2]Arab A, Rostami MJ, Ghavami B, 2019. An image encryption method based on chaos system and AES algorithm. J Supercomput, 75(10):6663-6682. [3]Boldyreva A, Imai H, Kobara K, 2010. How to strengthen the security of RSA-OAEP. IEEE Trans Inform Theory, 56(11):5876-5886. [4]Chen JX, Zhu ZL, Zhang LB, et al., 2018. Exploiting self-adaptive permutation-diffusion and DNA random encoding for secure and efficient image encryption. Signal Process, 142:340-353. [5]Chen LF, Zhao DM, Ge F, 2013. Image encryption based on singular value decomposition and Arnold transform in fractional domain. Opt Commun, 291:98-103. [6]El-Khamy SE, Korany NO, El-Sherif MH, 2017. A security enhanced robust audio steganography algorithm for image hiding using sample comparison in discrete wavelet transform domain and RSA encryption. Multim Tool Appl, 76(22):24091-24106. [7]Gan ZH, Chai XL, Han DJ, et al., 2019. A chaotic image encryption algorithm based on 3-D bit-plane permutation. Neur Comput Appl, 31(11):7111-7130. [8]Gong LH, Qiu KD, Deng CZ, et al., 2019a. An image compression and encryption algorithm based on chaotic system and compressive sensing. Opt Laser Technol, 115:257-267. [9]Gong LH, Qiu KD, Deng CZ, et al., 2019b. An optical image compression and encryption scheme based on compressive sensing and RSA algorithm. Opt Laser Eng, 121:169-180. [10]Hua ZY, Xu BX, Jin F, et al., 2019. Image encryption using Josephus problem and filtering diffusion. IEEE Access, 7:8660-8674. [11]Hui LCK, Lam KY, 1994. Fast square-and-multiply exponentiation for RSA. Electron Lett, 30(17):1396-1397. [12]Khashan OA, Zin AM, Sundararajan EA, 2015. ImgFS: a transparent cryptography for stored images using a filesystem in userspace. Front Inform Technol Electron Eng, 16(1):28-42. [13]Li P, Xu J, Mou J, et al., 2019. Fractional-order 4D hyperchaotic memristive system and application in color image encryption. EURASIP J Image Video Process, 2019:22. [14]Liu LF, Hao SD, Lin J, et al., 2018. Image block encryption algorithm based on chaotic maps. IET Signal Process, 12(1):22-30. [15]Liu ZJ, Gong M, Dou YK, et al., 2012. Double image encryption by using Arnold transform and discrete fractional angular transform. Opt Laser Eng, 50(2):248-255. [16]Mansouri A, Wang XY, 2020. Image encryption using shuffled Arnold map and multiple values manipulations. Vis Comput. [17]Méndez-Ramírez R, Arellano-Delgado A, Cruz-Hernández C, et al., 2018. Chaotic digital cryptosystem using serial peripheral interface protocol and its dsPIC implementation. Front Inform Technol Electron Eng, 19(2):165-179. [18]Mitchell CJ, 2016. On the security of 2-key triple DES. IEEE Trans Inform Theory, 62(11):6260-6267. [19]Mossa E, 2017. Security enhancement for AES encrypted speech in communications. Int J Speech Technol, 20(1):163-169. [20]Patidar V, Pareek NK, Purohit G, et al., 2011. A robust and secure chaotic standard map based pseudorandom permutation-substitution scheme for image encryption. Opt Commun, 284(19):4331-4339. [21]Rawat N, Kim B, Kumar R, 2016. Fast digital image encryption based on compressive sensing using structurally random matrices and Arnold transform technique. Optik, 127(4):2282-2286. [22]Sneha PS, Sankar S, Kumar AS, 2020. A chaotic colour image encryption scheme combining Walsh-Hadamard transform and Arnold-Tent maps. J Amb Intell Human Comput, 11(3):1289-1308. [23]Verma G, Liao MH, Lu DJ, et al., 2019. An optical asymmetric encryption scheme with biometric keys. Opt Laser Eng, 116:32-40. [24]Wu C, Hu LY, Wang Y, et al., 2019. Scalable asymmetric image encryption based on phase-truncation in cylindrical diffraction domain. Opt Commun, 448:26-32. [25]Xiao D, Wang Y, Xiang T, et al., 2017. High-payload completely reversible data hiding in encrypted images by an interpolation technique. Front Inform Technol Electron Eng, 18(11):1732-1743. [26]Yao LL, Yuan CJ, Qiang JJ, et al., 2017. An asymmetric color image encryption method by using deduced gyrator transform. Opt Laser Eng, 89:72-79. [27]Ye GD, 2010. Image scrambling encryption algorithm of pixel bit based on chaos map. Patt Recogn Lett, 31(5):347-354. [28]Ye GD, Huang XL, 2018. Spatial image encryption algorithm based on chaotic map and pixel frequency. Sci China Inform Sci, 61(5):058104. [29]Ye GD, Pan C, Huang XL, et al., 2018. An efficient pixel-level chaotic image encryption algorithm. Nonl Dynam, 94(1):745-756. [30]Yu SS, Zhou NR, Gong LH, et al., 2020. Optical image encryption algorithm based on phase-truncated short-time fractional Fourier transform and hyper-chaotic system. Opt Laser Eng, 124:105816. [31]Zhou NR, Zhang AD, Zheng F, et al., 2014. Novel image compression-encryption hybrid algorithm based on key-controlled measurement matrix in compressive sensing. Opt Laser Technol, 62:152-160. [32]Zhou NR, Hua TX, Gong LH, et al., 2015. Quantum image encryption based on generalized Arnold transform and double random-phase encoding. Quant Inform Process, 14(4):1193-1213. [33]Zhu HH, Chen XB, Yang YX, 2019. A quantum image dual-scrambling encryption scheme based on random permutation. Sci China Inform Sci, 62(12):229501. [34]Zhu ZL, Zhang W, Wong KW, et al., 2011. A chaos-based symmetric image encryption scheme using a bit-level permutation. Inform Sci, 181(6):1171-1186. Journal of Zhejiang University-SCIENCE, 38 Zheda Road, Hangzhou
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