In this paper we are interested in regularizing hyperparameter estimation by maximum likelihood in inverse problems with wavelet regularization. One parameter per subband will be estimated by gradient ascent algorithm. We have to face with twomain difficulties: i) sampling the a posteriori image distribution to compute the gradient; ii) choosing a suited step-size to ensure good convergence properties. We first show that introducing an auxiliary variable makes the sampling feasible using classical Metropolis-Hastings algorithm and Gibbs sampler. Secondly, we propose an adaptive step-size selection and a line-search strategy to improve the gradient-based method. Good performances of the proposed approach are demonstrated on both synthetic and real data.
ML estimation of wavelet regularization hyperparameters in inverse problems / Cavicchioli, Roberto; C., Chaux; L., Blanc Feraud; Zanni, Luca. - ELETTRONICO. - (2013), pp. 1553-1557. (Intervento presentato al convegno 2013 38th IEEE International Conference on Acoustics, Speech, and Signal Processing, ICASSP 2013 tenutosi a Vancouver, BC, can nel 26-31 maggio 2013) [10.1109/ICASSP.2013.6637912].
ML estimation of wavelet regularization hyperparameters in inverse problems
CAVICCHIOLI, ROBERTO;ZANNI, Luca
2013
Abstract
In this paper we are interested in regularizing hyperparameter estimation by maximum likelihood in inverse problems with wavelet regularization. One parameter per subband will be estimated by gradient ascent algorithm. We have to face with twomain difficulties: i) sampling the a posteriori image distribution to compute the gradient; ii) choosing a suited step-size to ensure good convergence properties. We first show that introducing an auxiliary variable makes the sampling feasible using classical Metropolis-Hastings algorithm and Gibbs sampler. Secondly, we propose an adaptive step-size selection and a line-search strategy to improve the gradient-based method. Good performances of the proposed approach are demonstrated on both synthetic and real data.
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