论文信息 - Fast MCMC computations for the estimation of sparse processes from noisy observations

Fast MCMC computations for the estimation of sparse processes from noisy observations

The paper presents a fast MCMC (Markov chain Monte Carlo) algorithm specially designed for high dimensional models with block structure. Such models are often met in Bayesian inference problems in signal processing, such as spectral estimation, harmonic analysis, blind deconvolution or signal classification. Our algorithm generates samples distributed according to a posterior distribution. We show that sampling the amplitudes together with the remaining model parameters leads to quicker computations than sampling from the marginal posterior, where amplitudes have been integrated out. Simulation results demonstrate the soundness of this approach for high dimensional models.

Jérôme Idier | Manuel Davy

[1] Simon J. Godsill,et al. Bayesian harmonic models for musical signal analysis , 2003 .

[2] Christophe Andrieu,et al. Joint Bayesian model selection and estimation of noisy sinusoids via reversible jump MCMC , 1999, IEEE Trans. Signal Process..

[3] Rong Chen,et al. Simultaneous wavelet estimation and deconvolution of reflection seismic signals , 1996, IEEE Trans. Geosci. Remote. Sens..

[4] Jean-Yves Tourneret,et al. Classification of chirp signals using hierarchical Bayesian learning and MCMC methods , 2002, IEEE Trans. Signal Process..

[5] Christophe Andrieu,et al. Bayesian deconvolution of noisy filtered point processes , 2001, IEEE Trans. Signal Process..

[6] Hoon Kim,et al. Monte Carlo Statistical Methods , 2000, Technometrics.

[7] Alain Herment,et al. Unsupervised frequency tracking beyond the Nyquist frequency using Markov chains , 2002, IEEE Trans. Signal Process..