Sparse adaptive Dirichlet-multinomial-like processes
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Hutter, Marcus
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Journal of Machine Learning Research
Abstract
Online estimation and modelling of i.i.d. data for short
sequences over large or complex ''alphabets'' is a ubiquitous
(sub)problem in machine learning, information theory, data
compression, statistical language processing, and document
analysis. The Dirichlet-Multinomial distribution (also called
Polya urn scheme) and extensions thereof are widely applied for
online i.i.d. estimation. Good a-priori choices for the
parameters in this regime are difficult to obtain though. I
derive an optimal adaptive choice for the main parameter via
tight, data-dependent redundancy bounds for a related model. The
1-line recommendation is to set the 'total mass' = 'precision' =
'concentration' parameter to m/2ln[(n+1)/m], where n
is the (past) sample size and m the number of different symbols
observed (so far). The resulting estimator is simple, online,
fast, and experimental performance is superb.
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Journal of Machine Learning Research
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Conference on Learning Theory: JMLR Workshop and Conference Proceedings, volume 30
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