Fixed-point iterations for several dissimilarity measure barycenters in
the Gaussian case
- URL: http://arxiv.org/abs/2205.04806v1
- Date: Tue, 10 May 2022 11:12:12 GMT
- Title: Fixed-point iterations for several dissimilarity measure barycenters in
the Gaussian case
- Authors: Alessandro D'Ortenzio, Costanzo Manes, Umut Orguner
- Abstract summary: In target tracking and sensor fusion contexts it is not unusual to deal with a large number of Gaussian densities.
Fixed-Point Iterations (FPI) are presented for the computation of barycenters according to several dissimilarity measures.
- Score: 69.9674326582747
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: In target tracking and sensor fusion contexts it is not unusual to deal with
a large number of Gaussian densities that encode the available information
(multiple hypotheses), as in applications where many sensors, affected by
clutter or multimodal noise, take measurements on the same scene. In such cases
reduction procedures must be implemented, with the purpose of limiting the
computational load. In some situations it is required to fuse all available
information into a single hypothesis, and this is usually done by computing the
barycenter of the set. However, such computation strongly depends on the chosen
dissimilarity measure, and most often it must be performed making use of
numerical methods, since in very few cases the barycenter can be computed
analytically. Some issues, like the constraint on the covariance, that must be
symmetric and positive definite, make it hard the numerical computation of the
barycenter of a set of Gaussians. In this work, Fixed-Point Iterations (FPI)
are presented for the computation of barycenters according to several
dissimilarity measures, making up a useful toolbox for fusion/reduction of
Gaussian sets in applications where specific dissimilarity measures are
required.
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