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Introduction to hierarchical tiling dynamical systems: Supertile construction methods

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Post-edited
Auteurs : Frank, Natalie Priebe (Auteur de la conférence)
CIRM (Editeur )

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symbolic substitutions one-dimensional self-similar tilings multidimensional substitutions self-similar tilings fusion rules $S$-adic systems tiling dynamical system questions of the audience

Résumé : These lectures introduce the dynamical systems approach to tilings of Euclidean space, especially quasicrystalline tilings that have been constructed using a ‘supertile method'. Because tiling dynamics parallels one-dimensional symbolic dynamics, we discuss this case as well, highlighting the differences and similarities in the methods of study and the results that can be obtained.
In the first lecture we motivate the field with the discovery of quasicrystals, which led to D. Schectman's winning the 2011 Nobel Prize in Chemistry. Then we set up the basics of tiling dynamics, describing tiling spaces, a tiling metric, and the shift or translation actions. Shift-invariant and ergodic measures are discussed, along with fundamental topological and dynamical properties.
The second lecture brings in the supertile construction methods, including symbolic substitutions, self-similar tilings, $S$-adic systems, and fusion rules. Numerous examples are given, most of which are not the “standard” examples, and we identify many commonalities and differences between these interrelated methods of construction. Then we compare and contrast dynamical results for supertile systems, highlighting those key insights that can be adapted to all cases.
In the third lecture we investigate one of the many current tiling research areas: spectral theory. Schectman made his Nobel-prize-winning discovery using diffraction analysis, and studying the mathematical version has been quite fruitful. Spectral theory of tiling dynamical systems is also of broad interest. We describe how these types of spectral analysis are carried out, give examples, and discuss what is known and unknown about the relationship between dynamical and diffraction analysis. Special attention is paid to the “point spectrum”, which is related to eigenfunctions and also to the bright spots that appear on diffraction images.

Codes MSC :
37B10 - Symbolic dynamics
37B50 - Multi-dimensional shifts of finite type, tiling dynamics
52C23 - Quasicrystals, aperiodic tilings

    Informations sur la Vidéo

    Réalisateur : Hennenfent, Guillaume
    Langue : Anglais
    Date de Publication : 28/11/2017
    Date de Captation : 21/11/2017
    Sous Collection : Research School
    Catégorie arXiv : Dynamical Systems ; Metric Geometry
    Domaine(s) : Géométrie ; Systèmes Dynamiques & EDO
    Format : MP4 (.mp4) - HD
    Durée : 01:20:16
    Audience : Chercheurs ; Etudiants Science Cycle 2
    Download : https://videos.cirm-math.fr/2017-11-21_Frank.mp4

Informations sur la Rencontre

Nom de la Rencontre : Jean-Morlet chair - Research school: Tiling dynamical system / Chaire Jean-Morlet - École de recherche : Pavages et systèmes dynamiques
Organisateurs de la Rencontre : Akiyama, Shigeki ; Arnoux, Pierre
Dates : 20/11/2017 - 24/11/2017
Année de la rencontre : 2017
URL de la Rencontre : https://www.chairejeanmorlet.com/1720.html

Données de citation

DOI : 10.24350/CIRM.V.19249603
Citer cette vidéo: Frank, Natalie Priebe (2017). Introduction to hierarchical tiling dynamical systems: Supertile construction methods. CIRM. Audiovisual resource. doi:10.24350/CIRM.V.19249603
URI : http://dx.doi.org/10.24350/CIRM.V.19249603

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