论文信息 - On initialization of Max's algorithm for optimum quantization

On initialization of Max's algorithm for optimum quantization

Two methods for initializing J. Max's (1960) iterative algorithm for optimum quantization for a rapid convergence of the algorithm are derived and tested. The methods, which are based on making an intelligent guess of the starting point, perform considerably better than the existing methods for a wide class of reasonably well-behaved unimodal density functions, while the amount of computations involved is negligible compared with what is involved in a single iteration of Max's algorithm. An interesting relationship between optimum quantizers of different levels is revealed in the derivation of these methods. This relationship could also be useful for scalar quantizer design. >

X. Wu | X. Wu

[1] Xiaolin Wu,et al. An O(KN lg N) algorithm for optimum K-level quantization on histograms of N points , 1989, CSC '89.

[2] Alexander V. Trushkin. Sufficient conditions for uniqueness of a locally optimal quantizer for a class of convex error weighting functions , 1982, IEEE Trans. Inf. Theory.

[3] ROGER C. WOOD,et al. On optimum quantization , 1969, IEEE Trans. Inf. Theory.

[4] James A. Bucklew,et al. A Note on the Computation of Optimal Minimum Mean-Square Error Quantizers , 1982, IEEE Trans. Commun..

[5] S. P. Lloyd,et al. Least squares quantization in PCM , 1982, IEEE Trans. Inf. Theory.

[6] Joel Max,et al. Quantizing for minimum distortion , 1960, IRE Trans. Inf. Theory.

[7] JOHN C. KIEFFER,et al. Uniqueness of locally optimal quantizer for log-concave density and convex error weighting function , 1983, IEEE Trans. Inf. Theory.

[8] Gary L. Wise,et al. A Further Investigation of Max's Algorithm for Optimum Quantization , 1985, IEEE Trans. Commun..

[9] G. M. Roe. Quantizing for minimum distortion (Corresp.) , 1964, IEEE Transactions on Information Theory.