{"status":"ok","message-type":"work","message-version":"1.0.0","message":{"indexed":{"date-parts":[[2026,3,31]],"date-time":"2026-03-31T07:20:48Z","timestamp":1774941648613,"version":"3.50.1"},"reference-count":29,"publisher":"MDPI AG","issue":"4","license":[{"start":{"date-parts":[[2020,4,10]],"date-time":"2020-04-10T00:00:00Z","timestamp":1586476800000},"content-version":"vor","delay-in-days":0,"URL":"https:\/\/creativecommons.org\/licenses\/by\/4.0\/"}],"funder":[{"DOI":"10.13039\/100010663","name":"H2020 European Research Council","doi-asserted-by":"publisher","award":["786854"],"award-info":[{"award-number":["786854"]}],"id":[{"id":"10.13039\/100010663","id-type":"DOI","asserted-by":"publisher"}]}],"content-domain":{"domain":[],"crossmark-restriction":false},"short-container-title":["Entropy"],"abstract":"This paper aims to describe a statistical model of wrapped densities for bi-invariant statistics on the group of rigid motions of a Euclidean space. Probability distributions on the group are constructed from distributions on tangent spaces and pushed to the group by the exponential map. We provide an expression of the Jacobian determinant of the exponential map of S E ( n ) which enables the obtaining of explicit expressions of the densities on the group. Besides having explicit expressions, the strengths of this statistical model are that densities are parametrized by their moments and are easy to sample from. Unfortunately, we are not able to provide convergence rates for density estimation. We provide instead a numerical comparison between the moment-matching estimators on S E ( 2 ) and R 3 , which shows similar behaviors.<\/jats:p>","DOI":"10.3390\/e22040432","type":"journal-article","created":{"date-parts":[[2020,4,13]],"date-time":"2020-04-13T04:45:31Z","timestamp":1586753131000},"page":"432","update-policy":"https:\/\/doi.org\/10.3390\/mdpi_crossmark_policy","source":"Crossref","is-referenced-by-count":3,"title":["A Bi-Invariant Statistical Model Parametrized by Mean and Covariance on Rigid Motions"],"prefix":"10.3390","volume":"22","author":[{"given":"Emmanuel","family":"Chevallier","sequence":"first","affiliation":[{"name":"Institut Fresnel, Aix-Marseille University, CNRS, Centrale Marseille, 13013 Marseille, France"}],"role":[{"role":"author","vocabulary":"crossref"}]},{"given":"Nicolas","family":"Guigui","sequence":"additional","affiliation":[{"name":"Universit\u00e9 C\u00f4te d\u2019Azur, Inria Epione, 06902 Sophia Antipolis, France"}],"role":[{"role":"author","vocabulary":"crossref"}]}],"member":"1968","published-online":{"date-parts":[[2020,4,10]]},"reference":[{"key":"ref_1","doi-asserted-by":"crossref","unstructured":"Chevallier, E. (2019). Towards Parametric Bi-Invariant Density Estimation on SE (2). Proceedings of International Conference on Geometric Science of Information, Springer.","DOI":"10.1007\/978-3-030-26980-7_72"},{"key":"ref_2","doi-asserted-by":"crossref","unstructured":"Pennec, X., and Arsigny, V. (2013). Exponential barycenters of the canonical Cartan connection and invariant means on Lie groups. Matrix Information Geometry, Springer.","DOI":"10.1007\/978-3-642-30232-9_7"},{"key":"ref_3","doi-asserted-by":"crossref","unstructured":"\u00c9mery, M., and Mokobodzki, G. (1991). Sur le barycentre d\u2019une probabilit\u00e9 dans une vari\u00e9t\u00e9. S\u00e9minaire de probabilit\u00e9s XXV, Springer.","DOI":"10.1007\/BFb0100858"},{"key":"ref_4","doi-asserted-by":"crossref","first-page":"127","DOI":"10.1007\/s10851-006-6228-4","article-title":"Intrinsic statistics on Riemannian manifolds: Basic tools for geometric measurements","volume":"25","author":"Pennec","year":"2006","journal-title":"J. Math. 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