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引用次数: 2

摘要

本文研究了基于贝叶斯技术的小波图像去噪。在传统的去噪过程中,概率密度函数(PDF)的参数通常由前几阶矩、均值和方差计算。本文提出了一种基于Pearson IV型随机向量的图像去噪算法。使用皮尔逊IV型是因为它允许将高阶矩(偏度和峰度)合并到无噪声小波系数的概率模型中。贝叶斯图像去噪方法的关键之一是估计收缩函数的统计参数。我们采用最大后验(MAP)估计来计算局部方差,对局部观测方差采用Gamma密度先验,对噪声小波系数采用高斯分布。实验结果表明,该方法具有较好的去噪效果。
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MAP estimation of Pearson Type IV random vectors in AWGN
This paper is concerned with wavelet-based image denoising using Bayesian technique. In conventional denoising process, The parameters of probability density function (PDF) are usually calculated from the first few moments, mean and variance. In this work, a new image denoising algorithm based on Pearson Type IV random vectors is proposed. Pearson Type IV is used because it allows higher-order moments (skewness and kurtosis) to be incorporated into the noiseless wavelet coefficients' probabilistic model. One of the cruxes of the Bayesian image denoising methods is to estimate statistical parameters for a shrinkage function. We employ maximum a posterior (MAP) estimation to calculate local variances with Gamma density prior for local observed variances and Gaussian distribution for noisy wavelet coefficients. The experimental results show that the proposed method yields good denoising results.
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