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La structure d'un calendrier peut être décrite par une suite de formes quasi-affines. Une telle suite, que j'appellerai base quasi-affine, généralise la notion de base de numération. Le problème de la conversion de dates est ainsi ramené à l'écriture du Jour Julien dans une telle base. Un algorithme de reconnaissance de droites discrètes permet d'obtenir la bonne base quasi-affine. À titre d'exemples sont traités les calendriers julien, grégorien, musulman et judaïque.
Henri Poincaré, à la fin du XIXe siècle, pensait déjà que le passage d’une à plusieurs variables complexes en analyse ne se réduisait pas à une simple généralisation de l’analyse à une variable. Lui-même a introduit dans des techniques de la théorie du potentiel (fonctions sousharmoniques dans ). Cependant, l’étude systématique d’une classe invariante par les isomorphismes analytiques complexes, celle des fonctions plurisousharmoniques, débute seulement en 1942. Une autre classe invariante, celle...
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