# Questions tagged [fractals]

Fractals deal with special sets that exhibit complicated patterns in every scale. Fractal sets usually have a Hausdorff dimension different from its topological dimension. Examples include Julia sets, the Sierpinski triangle, the Cantor set. Fractals naturally appear in dynamical system, such as iterations in the complex plane, or as strange attractors to continuous dynamical systems, (see Lorentz attractor).

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### A question about box dimension and Hölder condition

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### Local dimension of measures

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### Quantifierisation of maps

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### Is speaking about a fraction of the Mandelbrot's set meaningful?

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### "Snowflaked" Hausdorff metric

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### Is there a description of the points of the Cantor set on which the Cantor function is differentiable?

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### Hemispherical space filling hilbert curve

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### Is this result on the set of differentiability of the distance function to the fat cantor set new?

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### Closed set with full box dimension and non-full Hausdorff dimension

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### Limit set for IFS has either empty interior or dense interior

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### How to plot this fractal

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### Minkowski (box-counting) dimension of generalized Cantor set

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### Can the Mandelbrot set be designed through inequalities?

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### Box counting dimension and Besov spaces on $\mathbb R^2$

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### Convex Julia sets

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### Entropy spectrum is not concave

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### Can this number be interpreted as a fractal dimension?

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### Algorithm for computing external angles for the Mandelbrot set

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### How to add two numbers from a group theoretic perspective?

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### A set whose Hausdorff dimension gradually changes?

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### Hausdorff dimension between $(1,2)$

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### Is Domineering on any finite approximation of the Sierpinski Carpet always a second-player win?

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### How do sets with unit fractional Hausdorff measure of dimension $>1$ look like?

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### Set operations over iterated function systems

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### How can we not know the $s$-measure of the Sierpiński triangle?

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### Who proved that the Mandelbrot set's Julia sets are locally connected?

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### Numerically Evaluate the limit of the solution of a functional equation

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### Wavefront set of characteristic function of rough set

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### The Koch snow flake, Holder exponents of conformal mappings

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### Does fractallity depend on the Riemannian metric?

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### Hausdorff dimension and von Neumann dimension

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### Hausdorff outer measure is finite if $\sum_{j = 1}^m |f(x_i)-f(x_{i-1})|^s \le c$ [closed]

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### Covering lemmas in Hochman's ''On self-similar sets with overlaps and inverse theorems for entropy''

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### Fourier coeffients of Cantor measure

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### Pointless characterization relating between a fractal and its code space

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### Evaluating this limit in Fourier analysis

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### Box dimension as the critical value of the fractal content

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### Formal justification of the Chaos game in the Sierpinski triangle

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### Box dimension of the graph of an increasing function

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### Failure of Falconer distance problem in one dimension

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### Quasilinear elliptic problem on fractal domain

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### Set with modified lower box counting dimension strictly less than Hausdorff dimension

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### Has this self-similar sequence the ratio $(\sqrt2+1)^2$?

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### Why do weak and L metric topology for measures coincide?

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### Is the Mandelbrot set weakly self-similar?

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### Lipschitz property of holonomies fails when stable leaves $W^s(x)$ inside the leaves $W^{ss}(x)$

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### continuity entropy with respect gibbs measures

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### Is each Peano continuum a topological fractal?

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### How many two-dimensional space filling Hilbert-like curves are there?

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