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Monte Carlo Algorithm for Least Dependent Non-Negative Mixture Decomposition

Chemical Physics 2011-11-09 v1 Statistical Mechanics Information Theory math.IT Probability Statistics Theory Computational Physics Data Analysis, Statistics and Probability Statistics Theory

Abstract

We propose a simulated annealing algorithm (called SNICA for "stochastic non-negative independent component analysis") for blind decomposition of linear mixtures of non-negative sources with non-negative coefficients. The de-mixing is based on a Metropolis type Monte Carlo search for least dependent components, with the mutual information between recovered components as a cost function and their non-negativity as a hard constraint. Elementary moves are shears in two-dimensional subspaces and rotations in three-dimensional subspaces. The algorithm is geared at decomposing signals whose probability densities peak at zero, the case typical in analytical spectroscopy and multivariate curve resolution. The decomposition performance on large samples of synthetic mixtures and experimental data is much better than that of traditional blind source separation methods based on principal component analysis (MILCA, FastICA, RADICAL) and chemometrics techniques (SIMPLISMA, ALS, BTEM) The source codes of SNICA, MILCA and the MI estimator are freely available online at http://www.fz-juelich.de/nic/cs/software

Keywords

Cite

@article{arxiv.physics/0601161,
  title  = {Monte Carlo Algorithm for Least Dependent Non-Negative Mixture Decomposition},
  author = {Sergey A. Astakhov and Harald Stögbauer and Alexander Kraskov and Peter Grassberger},
  journal= {arXiv preprint arXiv:physics/0601161},
  year   = {2011}
}