Lebesgue decomposition in action via semidefinite relaxations
Résumé
Given all (finite) moments of two measures $\mu$ and $\lambda$ on $\R^n$, we provide a numerical scheme to
obtain the Lebesgue decomposition
$\mu=\nu+\psi$ with $\nu\ll\lambda$ and $\psi\perp\lambda$. When
$\nu$ has a density in $L_\infty(\lambda)$ then we obtain two sequences of finite moments vectors
of increasing size (the number of moments) which converge to the moments of $\nu$ and $\psi$ respectively, as the
number of moments increases. Importantly, {\it no} \`a priori knowledge on the supports of $\mu, \nu$ and $\psi$ is required.
Origine : Fichiers produits par l'(les) auteur(s)
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