Ensemble Riemannian Data Assimilation over the Wasserstein Space

In this paper, we present an ensemble data assimilation paradigm over a Riemannian manifold equipped with the Wasserstein metric. Unlike the Eulerian penalization of error in the Euclidean space, the Wasserstein metric can capture translation and difference between the shapes of square-integrable pr...

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Veröffentlicht in:	arXiv.org 2021-03
Hauptverfasser:	Tamang, Sagar K, Ebtehaj, Ardeshir, Van Leeuwen, Peter J, Zou, Dongmian, Lerman, Gilad
Format:	Artikel
Sprache:	eng
Schlagworte:	Data assimilation Euclidean geometry Euclidean space Riemann manifold Statistics - Methodology Systematic errors
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creator	Tamang, Sagar K Ebtehaj, Ardeshir Van Leeuwen, Peter J Zou, Dongmian Lerman, Gilad
description	In this paper, we present an ensemble data assimilation paradigm over a Riemannian manifold equipped with the Wasserstein metric. Unlike the Eulerian penalization of error in the Euclidean space, the Wasserstein metric can capture translation and difference between the shapes of square-integrable probability distributions of the background state and observations -- enabling to formally penalize geophysical biases in state-space with non-Gaussian distributions. The new approach is applied to dissipative and chaotic evolutionary dynamics and its potential advantages and limitations are highlighted compared to the classic variational and filtering data assimilation approaches under systematic and random errors.
doi_str_mv	10.48550/arxiv.2009.03443
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subjects	Data assimilation Euclidean geometry Euclidean space Riemann manifold Statistics - Methodology Systematic errors
title	Ensemble Riemannian Data Assimilation over the Wasserstein Space
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