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ebsd2021:quint [2021/08/07 20:11] tahzibiebsd2021:quint [2021/10/25 08:07] (current) tahzibi
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 +[[ebsd2021:participantsquint|Comments and questions of participants]]
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 HARMONIC ANALYSIS ON TREES HARMONIC ANALYSIS ON TREES
 +
 +There is a relationship which has now been studied for a few years between
 +thermodynamic formalism, as in the book of Parry and Pollicott and the theory
 +of unitary representations of certain discrete groups (see for example the work
 +of Boyer and Mayeda). The goal of the minicourse is to explain why such a
 +relation exists, in the case where the group is a finitely generated free group.
 +Then, the constructions rely on geometric properties of trees.
  
   - Ordered List Item Trees. I will present the standard geometric language on trees. This is mostly a flash course in CAT(-1) geometry.   - Ordered List Item Trees. I will present the standard geometric language on trees. This is mostly a flash course in CAT(-1) geometry.
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   - Thermodynamic formalism and unitary representations. Give a tree lattices, I will exhibit relationships between the thermodynamic formalism on the associated subshift and the theory of its unitary representations.   - Thermodynamic formalism and unitary representations. Give a tree lattices, I will exhibit relationships between the thermodynamic formalism on the associated subshift and the theory of its unitary representations.
  
 +References:
 +  - [[http://www.numdam.org/issue/AST_1990__187-188__1_0.pdf|Book of Parry-Pollicott]]
 +  - [[https://webusers.imj-prg.fr/~adrien.boyer/IrredGibbsr.pdf|Work of Boyer and Mayeda,]]
 +
 +
 +Notes:
 +
 +Introduction to Selberg's trace formula
 +
 +Excellent references for the following, very rough, notes are:
 +  * Martin R. Bridson and André Haefliger. Metric spaces of non-positive curvature, volume 319 of Grundlehren der Mathematischen Wissenschaften [Fundamental Principles of Mathematical Sciences]. Springer-Verlag, Berlin, 1999.
 +  * Adrien Boyer and Dustin Mayeda. Equidistribution, ergodicity and irreducibility associated with Gibbs measures. Comment. Math. Helv., 92(2):349–387, 2017.
 +  * Frédéric Paulin, Mark Pollicott, and Barbara Schapira. Equilibrium states in negative curvature. Asterisque, (373):viii+281, 2015.
 +
 +
 +[[https://drive.google.com/file/d/1wOXY1__0PjVpcNzxMWNCFzjlxSqFg-dx/view|Seminário de Manuel Stadlbauer (grupos hiperbólicos) e Carlos Matheus (Fórmula traço de Selberg)]]
 +
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 +[[ebsd2021:Bourdon|Bourdon metric]]
 +</WRAP>
 +
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 +[[ebsd2021:Gibbscocycle|Gibbs cocycle]]
 +</WRAP>
 +
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 +[[ebsd2021:Patterson|Patterson-Sullivan density]]
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 +[[ebsd2021:Gibbsstates|Gibbs states]]
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 ~~DISCUSSION~~ ~~DISCUSSION~~
ebsd2021/quint.1628377913.txt.gz · Last modified: 2021/08/07 20:11 by tahzibi