analysis on fractals - hausdor and spectral dimensiongoffeng/fractals18/freiberg_slides.pdfanalysis...
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Spectral approaches to fractal geometry
Analysis on Fractals - Hausdorff and
spectral dimension
Uta Freiberg
Universitat Stuttgart
Chalmers University of Technology, Gothenburg
September 18, 2018
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Plan of the lecture
0. Motivation
1. Analysis (= Laplacian) on fractals – history and overview
2. Dirichlet form approach (Kusuoka, Kigami)
3. Eigenvalues
(4. New directions: random fractals, Hanoi attractors,...)
(5. Einstein’s relation)
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1. Analysis (= Laplacian) on fractals
first ideas came from physicists...
... which led to mathematical theories...
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Classical approaches:
• limit of difference operators (Dirichlet form theory)
Kusuoka, Kigami, Lapidus, Mosco, Hambly, Teplyaev, Strichartz,...
• Construction of the”
natural“ Brownian motion as the limit
of a sequence of appropriate renormalized random walks
Kusuoka, Barlow, Bass, Perkins, Lindstrøm; Sabot, Metz,...
• Martin boundary theory on the Code space
Denker, Sato, Koch,...
• (fractal dimensional) traces of function spaces (for exp. So-
bolev spaces) or via Riesz potentials
Triebel, Haroske, Schmeißer,...; Zahle
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New approaches:
• Generalized Laplacians (∆–Beltrami, Hodge–∆, Dirac–∆)
M. Hinz, Teplyaev, Rogers,...
• Non-commutative Geometry: Interpretation of the fractal in
terms of spectral triple
Bellissard, Falconer, Samuel, Lapidus; Cipriani, Guido, Isola, ...
• Theory of resistance forms
Kigami, Kajino, Alonso–Ruiz, F. ,...
• Approximation by quantum graphs
Teplyaev, Kelleher, Alonso–Ruiz, F. ...; Mugnolo, Lenz, Keller, Post,
Kuchment, ...
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4.2 New directions: random fractals
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SG(3)–modified Sierpinski gasket (G)
measure scaling factor µ
µG = 1/6
length scaling factor r
rG = 1/3
energy/resistance scaling
factor % %G = 15/7
time scaling factor T = M%
TG = 90/7
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Random mixing I
”homogenous random“ (V = 1)
Hambly (’97 BM, ’99 heat
kernels, ’00 ∆)
(Kifer ’95, Stenflo ’01)
Coding: random sequence
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Random mixing II
”random recursive“,
”standard random “ (V =∞)
Hambly ’92 (BM), Bar-
low Hambly ’97 (∆)
(Falconer ’86, Mauldin
Williams ’86, Graf ’87,
Hutchinson Ruschendorf
’98, ’00)
Coding: random labelled
tree
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interpolation between these two models: V –variable fractals
developed by: Barnsley, Hutchinson, Stenflo
see: Barnsley’s book”
Superfractals“
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Coding: V –variable (labelled) tree
Hausdorff and box dimension: BHS, Forum Mathematicum
spectral dimension: F.HamblyHutchinson (2006-2016)
Annales Henri Poincare Probab. Stat. 53, 2162–2213, 2017
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other new directions:
random conductance models (Kumagai, Deuschel, ...)
GFF on fractals (Kumagai, Zeitouni, Chen, ...)