independent Component Analysis: algorithms and applications: Difference between revisions
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==Introduction== | ==Introduction== | ||
'''ICA''' shows, perhaps surprisingly, that the ''cocktail-party problem'' can be solved by imposing two rather weak (and realistic) assumptions, namely that the source signals are statistically independent and have non-Gaussian distributions. Note that PCA and classical factor analysis cannot solve the ''cocktail-party problem'' because such methods seek components that are merely uncorrelated, a condition much weaker than independence. | '''ICA''' shows, perhaps surprisingly, that the ''cocktail-party problem'' can be solved by imposing two rather weak (and often realistic) assumptions, namely that the source signals are statistically independent and have non-Gaussian distributions. Note that PCA and classical factor analysis cannot solve the ''cocktail-party problem'' because such methods seek components that are merely uncorrelated, a condition much weaker than independence. | ||
'''ICA''' has a lot of applications in science and engineering. For example, it can be used to find the original components of brain activity by analyzing electrical recordings of brain activity given by electroencephalogram (EEG). Another important application is to efficient representations of multimedia data for compression or denoising. | |||
===Definition of ICA=== | ===Definition of ICA=== |
Revision as of 13:03, 5 July 2009
Motivation
Imagine a room where two people are speaking at the same time and two microphones are used to record the speech signals. Denoting the speech signals by [math]\displaystyle{ s_1(t) \, }[/math] and [math]\displaystyle{ s_2(t)\, }[/math] and the recorded signals by [math]\displaystyle{ x_1(t) \, }[/math] and [math]\displaystyle{ x_2(t) \, }[/math], we can assume the linear relation [math]\displaystyle{ x = As \, }[/math], where [math]\displaystyle{ A \, }[/math] is a parameter matrix that depends on the distances of the microphones from the speakers. The interesting problem of estimating both [math]\displaystyle{ A\, }[/math] and [math]\displaystyle{ s\, }[/math] using only the recorded signals [math]\displaystyle{ x\, }[/math] is called the cocktail-party problem, which is the signature problem for ICA.
Introduction
ICA shows, perhaps surprisingly, that the cocktail-party problem can be solved by imposing two rather weak (and often realistic) assumptions, namely that the source signals are statistically independent and have non-Gaussian distributions. Note that PCA and classical factor analysis cannot solve the cocktail-party problem because such methods seek components that are merely uncorrelated, a condition much weaker than independence.
ICA has a lot of applications in science and engineering. For example, it can be used to find the original components of brain activity by analyzing electrical recordings of brain activity given by electroencephalogram (EEG). Another important application is to efficient representations of multimedia data for compression or denoising.