- Oral presentation
- Open access
- Published:
An online Hebbian learning rule that performs independent component analysis
BMC Neuroscience volume 9, Article number: O13 (2008)
The so-called cocktail party problem refers to a situation where several sound sources are simultaneously active, e.g. persons talking at the same time. The goal is to recover the initial sound sources from the measurement of the mixed signals. A standard method of solving the cocktail party problem is independent component analysis (ICA), which can be performed by a class of powerful algorithms. However, classical algorithms based on higher moments of the signal distribution [1] do not consider temporal correlations, i.e. data points corresponding to different time slices could be shuffled without a change in the results. But time order is important since most natural signal sources have intrinsic temporal correlations that could potentially be exploited. Therefore, some algorithms have been developed to take into account those temporal correlations, e.g. algorithms based on delayed correlations [2, 3] potentially combined with higher-order statistics [4], based on innovation processes [5], or complexity pursuit [6]. However, those methods are rather algorithmic and most of them are difficult to interpret biologically, e.g. they are not online or not local or require a preprocessing of the data.
Biological learning algorithms are usually implemented as an online Hebbian learning rule that triggers changes of synaptic efficacy based on the correlations between pre- and postsynaptic neurons. A Hebbian learning rule, like Oja's learning rule [7], combined with a linear neuron model, has been shown to perform principal component analysis (PCA). Simply using a nonlinear neuron combined with Oja's learning rule allows one to compute higher moments of the distributions which yields ICA if the signals have been preprocessed (whitening) at an earlier stage [1]. Here, we are interested in exploiting the correlation of the signals at different time delays, i.e. a generalization of the theory of Molgedey and Schuster [3]. We will show that a linear neuron model combined with a Hebbian learning rule based on the joint firing rates of the pre- and postsynaptic neurons of different time delays performs ICA by exploiting the temporal correlations of the presynaptic inputs (Figure 1).
References
Hyvaerinen A, Karhunen J, Oja E: Independent Component Analysis. 2001, Wiley-Interscience
Ziehe A, Muller K: TDSEP – an efficient algorithm for blind separation using time structure. Proc Int Conf on Art Neur Net. 1998
Molgedey L, Schuster H: Separation of a mixture of independent signals using time delayed correlations. Phys. Rev. Lett. 1994, 72: 3634-3637. 10.1103/PhysRevLett.72.3634.
Mueller K, Philips P, Ziehe A: JADE TD: Combining higher-order statistics and temporal information for blind source separation (with noise). Proc Int Workshop on ICA. 1999
Hyvaerinen A: Independent component analysis for time-dependent stochastic processes. Proc Int Conf on Art Neur Net. 1998
Hyvaerinen A: Complexity pursuit: Separating interesting components from time-series. Neural Comput. 2001, 13: 883-898. 10.1162/089976601300014394.
Oja E: A simplified neuron model as principal component analyzer. J Math Biology. 1982, 15: 267-273. 10.1007/BF00275687.
Author information
Authors and Affiliations
Corresponding author
Rights and permissions
Open Access This article is published under license to BioMed Central Ltd. This is an Open Access article is distributed under the terms of the Creative Commons Attribution 2.0 International License (https://creativecommons.org/licenses/by/2.0), which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.
About this article
Cite this article
Clopath, C., Longtin, A. & Gerstner, W. An online Hebbian learning rule that performs independent component analysis. BMC Neurosci 9 (Suppl 1), O13 (2008). https://doi.org/10.1186/1471-2202-9-S1-O13
Published:
DOI: https://doi.org/10.1186/1471-2202-9-S1-O13