par JEAN-YVES BRIEND et JULIEN DUVAL RÉSUMÉ. -Soit µ la mesure d'équilibre d'un endomorphisme de P k (C). Nous montrons ici qu'elle est son unique mesure d'entropie maximale. Nous construisons directement µ comme distribution asymptotique des préimages de tout point hors d'un ensemble exceptionnel algébrique.ABSTRACT. -Let µ be the equilibrium measure of an endomorphism of P k (C). We show that it is its unique measure of maximal entropy. We build µ directly as the distribution of premiages of any point outside an algebraic exceptional set.
HighlightsAn open-source atrial wall thickness CT and MRI dataset (n=20) with consensus ground truth obtained with statistical estimation from expert delineation (n=2).Exploring a range of metrics for evaluating and ranking wall segmentation and thickness algorithms (n=6), and benchmarks were set on each metric.New three-dimensional mean thickness atlases for atrial wall thickness derived from the consensus ground truth. The atlas was also transformed into a two-dimensional flat map of thickness.
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