Title of article
Nonparametric Hypothesis Tests for Statistical Dependency
Author/Authors
A. T. Ihler ، نويسنده , , J. W. Fisher، نويسنده , , and A. S. Willsky، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2004
Pages
16
From page
2234
To page
2249
Abstract
Determining the structure of dependencies among a
set of variables is a common task in many signal and image processing
applications, including multitarget tracking and computer
vision. In this paper, we present an information-theoretic, machine
learning approach to problems of this type. We cast this problem
as a hypothesis test between factorizations of variables into mutually
independent subsets. We show that the likelihood ratio can be
written as sums of two sets of Kullback–Leibler (KL) divergence
terms. The first set captures the structure of the statistical dependencies
within each hypothesis, whereas the second set measures
the details of model differences between hypotheses. We then consider
the case when the signal prior models are unknown, so that
the distributions of interest must be estimated directly from data,
showing that the second set of terms is (asymptotically) negligible
and quantifying the loss in hypothesis separability when the models
are completely unknown. We demonstrate the utility of nonparametric
estimation methods for such problems, providing a general
framework for determining and distinguishing between dependency
structures in highly uncertain environments. Additionally,
we develop a machine learning approach for estimating lower
bounds on KL divergence and mutual information from samples
of high-dimensional random variables for which direct density estimation
is infeasible.We present empirical results in the context of
three prototypical applications: association of signals generated by
sources possessing harmonic behavior, scene correspondence using
video imagery, and detection of coherent behavior among sets of
moving objects.
Keywords
Data association , Factorization , hypothesis testing , independence tests , Kullback–Leibler divergence , mutual information , nonparametric. , Kernel density estimates
Journal title
IEEE TRANSACTIONS ON SIGNAL PROCESSING
Serial Year
2004
Journal title
IEEE TRANSACTIONS ON SIGNAL PROCESSING
Record number
403612
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