Multiparameter discrete transforms based on discrete orthogonal polynomials and their application to image watermarking

被引：2

作者：

Annaby, M. H. ^{[1
]}

Ayad, H. A. ^{[1
]}

Prestin, Juergen ^{[2
]}

Rushdi, Muhammad A. ^{[3
]}

机构：

[1] Cairo Univ, Fac Sci, Dept Math, Giza 12613, Egypt

[2] Univ Lubeck, Inst Math, Ratzeburger Allee 160, D-23562 Lubeck, Germany

[3] Cairo Univ, Fac Engn, Dept Biomed Engn & Syst, Giza 12613, Egypt

来源：

SIGNAL PROCESSING-IMAGE COMMUNICATION | 2021年 / 99卷

关键词：

Discrete orthogonal polynomials; Multiparameter discrete Krawtchouk transform; Multiparameter discrete Chebyshev transform; Multiparameter discrete Charlier transform; Fast computations; Blind image watermarking; COMPUTATION; MOMENTS; RECONSTRUCTION; RECOGNITION;

D O I：

10.1016/j.image.2021.116434

中图分类号：

TM [电工技术]; TN [电子技术、通信技术];

学科分类号：

0808 ; 0809 ;

摘要：

Applications of discrete orthogonal polynomials (DOPs) in image processing have been recently emerging. In particular, Krawtchouk, Chebyshev, and Charlier DOPs have been applied as bases for image analysis in the frequency domain. However, fast realizations and fractional-type generalizations of DOP-based discrete transforms have been rarely addressed. In this paper, we introduce families of multiparameter discrete fractional transforms via orthogonal spectral decomposition based on Krawtchouk, Chebyshev, and Charlier DOPs. The eigenvalues are chosen arbitrarily in both unitary and non-unitary settings. All families of transforms, for varieties of eigenvalues, are applied in image watermarking. We also exploit recently introduced fast techniques to reduce complexity for the Krawtchouk case. Experimental results show the robustness of the proposed transforms against watermarking attacks.

引用

页数：16

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