Title :
Laplace Random Vectors, Gaussian Noise, and the Generalized Incomplete Gamma Function
Author_Institution :
Polytech. Univ. Brooklyn, NY, USA
Abstract :
Wavelet domain statistical modeling of images has focused on modeling the peaked heavy-tailed behavior of the marginal distribution and on modeling the dependencies between coefficients that are adjacent (in location and/or scale). In this paper we describe the extension of the Laplace marginal model to the multivariate case so that groups of wavelet coefficients can be modeled together using Laplace marginal models. We derive the nonlinear MAP and MMSE shrinkage functions for a Laplace vector in Gaussian noise and provide computationally efficient approximations to them. The development depends on the generalized incomplete Gamma function.
Keywords :
Gaussian noise; approximation theory; image restoration; maximum likelihood estimation; statistical analysis; wavelet transforms; Gaussian noise; Laplace marginal model; MMSE shrinkage function; approximation; generalized incomplete Gamma function; heavy-tailed behavior; image focusing; nonlinear MAP; wavelet domain statistical modeling; Additive noise; Exponential distribution; Gaussian noise; Image restoration; Level set; Noise reduction; Random variables; Wavelet coefficients; Wavelet domain; Wavelet transforms; Estimation; Exponential distributions; Image restoration; MAP estimation; Wavelet transforms;
Conference_Titel :
Image Processing, 2006 IEEE International Conference on
Conference_Location :
Atlanta, GA
Print_ISBN :
1-4244-0480-0
DOI :
10.1109/ICIP.2006.312821
