Title :
Random-Coding Lower Bounds for the Error Exponent of Joint Quantization and Watermarking Systems
Author :
Zhong, Yangfan ; Alajaji, Fady ; Linder, Tamás
Author_Institution :
Bank of Montreal, Toronto, ON
fDate :
7/1/2009 12:00:00 AM
Abstract :
We establish random-coding lower bounds to the error exponent of discrete and Gaussian joint quantization and private watermarking systems. In the discrete system, both the covertext and the attack channel are memoryless and have finite alphabets. In the Gaussian system, the covertext is memoryless Gaussian and the attack channel has additive memoryless Gaussian noise. In both cases, our bounds on the error exponent are positive in the interior of the achievable quantization and watermarking rate region.
Keywords :
Gaussian noise; data encapsulation; quantisation (signal); random codes; watermarking; Gaussian joint quantization; additive memoryless Gaussian noise; capacity region; error exponent; information hiding; private watermarking; random coding lower bounds; Additive noise; Copyright protection; Decoding; Gaussian noise; Gaussian processes; Intellectual property; Interference constraints; Quantization; Statistics; Watermarking; Capacity region; Gaussian-type class; error exponent; information hiding; joint quantization and watermarking; private watermarking; random-coding lower bound;
Journal_Title :
Information Theory, IEEE Transactions on
DOI :
10.1109/TIT.2009.2021383
