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. Dans-un-deuxième-temps, Gromov pour contrôler la dynamique locale des applications de classe C r . On présente une preuve complète du lemme algébrique de Gromov, qui est un point clé de la théorie de Yomdin Aussi nous déduisons de nouvelles applications dynamiques de cette théorie : d'une part nous bornons l'entropie de queue mesurée en fonction de l'exposant de Lyapounov ; d'autre part nous généralisons une formule due à J.Buzzi pour l'entropie k-dimensionnelle d'un produit d'applications de classe C ? . On s'intéresse enn à la théorie des extensions symboliques due à M