Karhunen-Loeve expansion revisited for vector-valued random fields: scaling, errors and optimal basisReport as inadecuate




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1 MSME - Laboratoire de Modélisation et Simulation Multi Echelle 2 NAVIER UMR 8205 - Laboratoire Navier 3 SNCF - Direction de l-Innovation et de la Recherche 4 Dynamique des structures et identification NAVIER UMR 8205 - Laboratoire Navier

Abstract : Due to scaling effects, when dealing with vector-valued random fields, the classical Karhunen-Loève expansion, which is optimal with respect to the total mean square error, tends to favorize the components of the random field that have the highest signal energy. When these random fields are to be used in mechanical systems, this phenomenon can introduce undesired biases for the results. This paper presents therefore an adaptation of the Karhunen- Loève expansion that allows us to control these biases and to minimize them. This original decomposition is first analyzed from a theoretical point of view, and is then illustrated on a numerical example.

Keywords : uncertainty quantification optimal basis vector-valued random field Karhunen-Loeve expansion





Author: Guillaume Perrin - Christian Soize - Denis Duhamel - Christine Fünfschilling -

Source: https://hal.archives-ouvertes.fr/



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