Integer Discrete Cosine Transform via Lossless Walsh-Hadamard Transform with Structural Regularity for Low-Bit-Word-Length
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概要
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This paper presents an integer discrete cosine transform (IntDCT) with only dyadic values such as k/2n (k, $n\in\mathbb{N}$). Although some conventional IntDCTs have been proposed, they are not suitable for lossless-to-lossy image coding in low-bit-word-length (coefficients) due to the degradation of the frequency decomposition performance in the system. First, the proposed M-channel lossless Walsh-Hadamard transform (LWHT) can be constructed by only (log2M)-bit-word-length and has structural regularity. Then, our 8-channel IntDCT via LWHT keeps good coding performance even if low-bit-word-length is used because LWHT, which is main part of IntDCT, can be implemented by only 3-bit-word-length. Finally, the validity of our method is proved by showing the results of lossless-to-lossy image coding in low-bit-word-length.
著者
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IKEHARA Masaaki
Department of Electronics and Electrical Engineering, Keio University
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SUZUKI Taizo
Department of Electronics and Electrical Engineering, Keio University
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