Horocycle dynamics : new invariants and eigenform loci in the stratum H(1, 1)

Horocycle dynamics : new invariants and eigenform loci in the stratum H(1, 1)

We study dynamics of the horocycle flow on strata of translation surfaces, introduce new invariants for ergodic measures, and analyze the interaction of the horocycle flow and real Rel surgeries. We use this analysis to complete and extend results of Calta and Wortman classifying horocycle-invariant...

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Détails bibliographiques
Auteurs principaux : Bainbridge Matt (Auteur), Smillie John (Auteur), Weiss Barak (Auteur)
Format : Livre
Langue : anglais
Titre complet : Horocycle dynamics : new invariants and eigenform loci in the stratum H(1, 1) / Matt Bainbridge, John Smillie, Barak Weiss
Publié : Providence (R.I.) : American Mathematical Society , 2022
Description matérielle : 1 vol. (V-100 p.)
Collection : Memoirs of the American Mathematical Society ; 1384
Sujets :
Dynamique topologique
Théorie ergodique
Systèmes dynamiques aléatoires
Documents associés : Autre format: Horocycle dynamics : new invariants and eigenform loci in the stratum H(1, 1)
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330 |a We study dynamics of the horocycle flow on strata of translation surfaces, introduce new invariants for ergodic measures, and analyze the interaction of the horocycle flow and real Rel surgeries. We use this analysis to complete and extend results of Calta and Wortman classifying horocycle-invariant measures in the eigenform loci. In addition we classify the horocycle orbit-closures and prove that every orbit is equidistributed in its orbit-closure. We also prove equidistribution results describing limits of sequences of measures. Our results have applications to the problem of counting closed trajectories on translation surfaces of genus 2.  |2 résumé des auteurs 
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