Résumé : Low-discrepancy sequences are the best discrete approximations of the continuous uniform distribution. Two of the most classical constructions are the van der Corput sequence and the family of Kronecker sequences. Apart from their uniformity, their construction methods lead to very nice mathematical properties. In this talk, I will present some ways to use their regularity, first to tackle an old problem of Erdos and de Bruijn (1949) on lengths of consecutive segments, and then to obtain embeddings in translation surfaces.

Dernière modification : Wednesday 25 February 2026

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