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Part 2 : Methodological Foundations 2.1. Robot heads and acoustic laboratories      2.2. Binaural Processing Pipeline      2.3. Continuous-time Fourier transform      2.4. Continuous short-time

In this talk, we present a new algorithm for the computation of discrete logarithms in finite fields of small characteristic. This algorithm combines several previously existing techniques with a few

Our recent joint work with D. Gu established a discrete version of the uniformization theorem for compact polyhedral surfaces.   In this talk, we prove that discrete uniformizaton maps converge to

Fonctions zêtas fractales et applications<br>Fonctions zêtas fractales, Application à l'étude de la géométrie des fractales discrètes

The goal of the course is to introduce some of the recent developments on discrete conformal geometry of polyhedral surfaces. We plan to cover the following topics. - The Andreev-Koebe-Thurston

The goal of the course is to introduce some of the recent developments on discrete conformal geometry of polyhedral surfaces. We plan to cover the following topics. - The Andreev-Koebe-Thurston

The goal of the course is to introduce some of the recent developments on discrete conformal geometry of polyhedral surfaces. We plan to cover the following topics. - The Andreev-Koebe-Thurston

The goal of the course is to introduce some of the recent developments on discrete conformal geometry of polyhedral surfaces. We plan to cover the following topics. - The Andreev-Koebe-Thurston

The goal of the course is to introduce some of the recent developments on discrete conformal geometry of polyhedral surfaces. We plan to cover the following topics. - The Andreev-Koebe-Thurston

"La "" crise des fondements "" s'ouvre en 1897 avec le paradoxe de Burali-Forti, une contradiction dans la toute jeune théorie des Ensembles. Parmi les solutions proposées, le "" Programme de Hilbert

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