Dynamic watermarking scheme for quantum images based on Hadamard transform

被引:0
作者
Xianhua Song
Shen Wang
Ahmed A. Abd El-Latif
Xiamu Niu
机构
[1] Harbin Institute of Technology,School of Computer Science and Technology
[2] Harbin University of Science and Technology,Department of Applied Mathematics
[3] Menoufia University,Department of Mathematics, Faculty of Science
来源
Multimedia Systems | 2014年 / 20卷
关键词
Quantum computation; Hadamard transform; Quantum image; Watermarking;
D O I
暂无
中图分类号
学科分类号
摘要
In this paper, a novel watermarking scheme for quantum images based on Hadamard transform is proposed. In the new scheme, a unitary transform controlled by a classical binary key is implemented on quantum image. Then, we utilize a dynamic vector, instead of a fixed parameter as in other previous schemes, to control the embedding process. The dynamic embedding vector is decided by both the carrier quantum image and the watermark image, which is only known by the authorized owner. The proposed scheme is analyzed from visual quality, computational complexity, and payload capacity. Analysis and results show that the proposed scheme has better visual quality under a higher embedding capacity and lower complexity compared with other schemes proposed recently.
引用
收藏
页码:379 / 388
页数:9
相关论文
共 53 条
[1]  
Zhang F(2008)Digital image watermarking capacity and detection error rate Pattern Recogn. Lett. 28 1-10
[2]  
Zhang X(2010)Estimating watermarking capacity in gray scale images based on image complexity EURASIP J. Adv. Signal Process. 10 63-84
[3]  
Zhang H(2010)A flexible representation of quantum image for polynomial preparation, image compression and processing operations Quantum Inf. Process. 5105 137-147
[4]  
Yaghmaee F(2003)Storing, processing and retrieving an image using quantum mechanics Proc. SPIE Conf. Quantum Inf. Comput. 12 2833-2860
[5]  
Jamzad M(2012)Quantum image encryption and decryption algorithms based on quantum image geometric transformations Int. J. Theor. Phys. 7824 366-375
[6]  
Le PQ(2013)NEQR: a novel enhanced quantum representation of digital images Quantum Inf. Process. 12 3103-3126
[7]  
Dong F(2013)Image representation and processing using ternary quantum computing Adapt. Nat. Comput. Algorithms. 186 126-149
[8]  
Hirota K(2013)A novel quantum representation for log-polar images Quantum Inf. Process. 40 113-123
[9]  
Venegas-Andraca SE(2011)Watermarking and authentication of quantum images based on restricted geometric transformations Inform. Sci. 52 3457-153
[10]  
Boss S(2010)Fast geometric transformations on quantum images IAENG Int. J. Appl. Math. 54 147-undefined
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