Non-Gaussian interaction information: estimation, optimization and diagnostic application of triadic wave resonance

Non-Gaussian interaction information: estimation, optimization and diagnostic application of triadic wave resonance

Non-Gaussian multivariate probability distributions, derived from climate and geofluid statistics, allow for nonlinear correlations between linearly uncorrelated components, due to joint Shannon negentropies. Triadic statistical dependence under pair-wise (total or partial) independence is thus poss...

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Main Authors: C. A. L. Pires, R. A. P. Perdigão
Format: Article
Language:English
Published: Copernicus Publications 2015-02-01
Series:Nonlinear Processes in Geophysics
Online Access:http://www.nonlin-processes-geophys.net/22/87/2015/npg-22-87-2015.pdf
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spelling doaj-a76de706e28645a29ebefa7d4a71ecf62020-11-24T23:14:21ZengCopernicus PublicationsNonlinear Processes in Geophysics1023-58091607-79462015-02-012218710810.5194/npg-22-87-2015Non-Gaussian interaction information: estimation, optimization and diagnostic application of triadic wave resonanceC. A. L. Pires0R. A. P. Perdigão1Instituto Dom Luiz (IDL), Faculdade de Ciências, Universidade de Lisboa, 1749-016 Lisbon, PortugalInstitute of Hydraulic Engineering and Water Resources Management, Vienna University of Technology, Vienna, AustriaNon-Gaussian multivariate probability distributions, derived from climate and geofluid statistics, allow for nonlinear correlations between linearly uncorrelated components, due to joint Shannon negentropies. Triadic statistical dependence under pair-wise (total or partial) independence is thus possible. Synergy or interaction information among triads is estimated. We formulate an optimization method of triads in the space of orthogonal rotations of normalized principal components, relying on the maximization of third-order cross-cumulants. Its application to a minimal one-dimensional, periodic, advective model leads to enhanced triads that occur between oscillating components of circular or locally confined wave trains satisfying the triadic wave resonance condition.http://www.nonlin-processes-geophys.net/22/87/2015/npg-22-87-2015.pdf
collection DOAJ
language English
format Article
sources DOAJ
author C. A. L. Pires
R. A. P. Perdigão
spellingShingle C. A. L. Pires
R. A. P. Perdigão
Non-Gaussian interaction information: estimation, optimization and diagnostic application of triadic wave resonance
Nonlinear Processes in Geophysics
author_facet C. A. L. Pires
R. A. P. Perdigão
author_sort C. A. L. Pires
title Non-Gaussian interaction information: estimation, optimization and diagnostic application of triadic wave resonance
title_short Non-Gaussian interaction information: estimation, optimization and diagnostic application of triadic wave resonance
title_full Non-Gaussian interaction information: estimation, optimization and diagnostic application of triadic wave resonance
title_fullStr Non-Gaussian interaction information: estimation, optimization and diagnostic application of triadic wave resonance
title_full_unstemmed Non-Gaussian interaction information: estimation, optimization and diagnostic application of triadic wave resonance
title_sort non-gaussian interaction information: estimation, optimization and diagnostic application of triadic wave resonance
publisher Copernicus Publications
series Nonlinear Processes in Geophysics
issn 1023-5809
1607-7946
publishDate 2015-02-01
description Non-Gaussian multivariate probability distributions, derived from climate and geofluid statistics, allow for nonlinear correlations between linearly uncorrelated components, due to joint Shannon negentropies. Triadic statistical dependence under pair-wise (total or partial) independence is thus possible. Synergy or interaction information among triads is estimated. We formulate an optimization method of triads in the space of orthogonal rotations of normalized principal components, relying on the maximization of third-order cross-cumulants. Its application to a minimal one-dimensional, periodic, advective model leads to enhanced triads that occur between oscillating components of circular or locally confined wave trains satisfying the triadic wave resonance condition.
url http://www.nonlin-processes-geophys.net/22/87/2015/npg-22-87-2015.pdf
work_keys_str_mv AT calpires nongaussianinteractioninformationestimationoptimizationanddiagnosticapplicationoftriadicwaveresonance
AT rapperdigao nongaussianinteractioninformationestimationoptimizationanddiagnosticapplicationoftriadicwaveresonance
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