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Displaying 41 – 60 of 343

Bi-Lipschitz embeddings of hyperspaces of compact sets

Jeremy T. Tyson (2005)

Fundamenta Mathematicae

We study the bi-Lipschitz embedding problem for metric compacta hyperspaces. We observe that the compacta hyperspace K(X) of any separable, uniformly disconnected metric space X admits a bi-Lipschitz embedding in ℓ². If X is a countable compact metric space containing at most n nonisolated points, there is a Lipschitz embedding of K(X) in $ℝ^{n + 1}$ ; in the presence of an additional convergence condition, this embedding may be chosen to be bi-Lipschitz. By way of contrast, the hyperspace K([0,1]) of the...

Brownian motion on fractals and function spaces.

Alf Jonsson (1996)

Mathematische Zeitschrift

Calculs de dimensions de packing

Fathi Ben Nasr (1996)

Colloquium Mathematicae

Caloric measure on domains bounded by Weierstrass-type graphs.

Bousch, Thierry, Heurteaux, Yanick (2000)

Annales Academiae Scientiarum Fennicae. Mathematica

Cauchy transforms of self-similar measures.

Lund, John-Peter, Strichartz, Robert S., Vinson, Jade P. (1998)

Experimental Mathematics

Centered densities and fractal measures.

Edgar, G.A. (2007)

The New York Journal of Mathematics [electronic only]

Characterization of local dimension functions of subsets of $ℝ^{d}$

L. Olsen (2005)

Colloquium Mathematicae

For a subset $E \subseteq ℝ^{d}$ and $x \in ℝ^{d}$ , the local Hausdorff dimension function of E at x is defined by $d i m_{H, l o c} (x, E) = l i m_{r ↘ 0} d i m_{H} (E \cap B (x, r))$ where $d i m_{H}$ denotes the Hausdorff dimension. We give a complete characterization of the set of functions that are local Hausdorff dimension functions. In fact, we prove a significantly more general result, namely, we give a complete characterization of those functions that are local dimension functions of an arbitrary regular dimension index.

Characterizations of snowflake metric spaces.

Tyson, Jeremy T., Wu, Jang-Mei (2005)

Annales Academiae Scientiarum Fennicae. Mathematica

Characterizing growth and form of fractal cities with allometric scaling exponents.

Chen, Yanguang (2010)

Discrete Dynamics in Nature and Society

Classes of measures which can be embedded in the simple symmetric random walk.

Cox, Alexander M.G., Obloj, Jan K. (2008)

Electronic Journal of Probability [electronic only]

Complex dimensions of self-similar fractal strings and Diophantine approximation.

Lapidus, Michel L., van Frankenhuysen, Machiel (2003)

Experimental Mathematics

Concerning Sets of the First Baire Category with Respect to Different Metrics

Maria Moszyńska, Grzegorz Sójka (2010)

Bulletin of the Polish Academy of Sciences. Mathematics

We prove that if $ϱ_{H}$ and δ are the Hausdorff metric and the radial metric on the space ⁿ of star bodies in ℝ, with 0 in the kernel and with radial function positive and continuous, then a family ⊂ ⁿ that is meager with respect to $ϱ_{H}$ need not be meager with respect to δ. Further, we show that both the family of fractal star bodies and its complement are dense in ⁿ with respect to δ.

Conformal measures for rational functions revisited

Manfred Denker, R. Mauldin, Z. Nitecki, Mariusz Urbański (1998)

Fundamenta Mathematicae

We show that the set of conical points of a rational function of the Riemann sphere supports at most one conformal measure. We then study the problem of existence of such measures and their ergodic properties by constructing Markov partitions on increasing subsets of sets of conical points and by applying ideas of the thermodynamic formalism.

Conjugate gradient algorithm and fractals.

Sahari, Mohamed Lamine, Djellit, Ilhem (2006)

Discrete Dynamics in Nature and Society

Constructing a Laplacian on the diamond fractal.

Kigami, Jun, Strichartz, Robert S., Walker, Katharine C. (2001)

Experimental Mathematics

Construction of functions with prescribed Hölder and chirp exponents.

Stéphane Jaffard (2000)

Revista Matemática Iberoamericana

We show that the Hölder exponent and the chirp exponent of a function can be prescribed simultaneously on a set of full measure, if they are both lower limits of continuous functions. We also show that this result is optimal: In general, Hölder and chirp exponents cannot be prescribed outside a set of Hausdorff dimension less than one. The direct part of the proof consists in an explicit construction of a function determined by its orthonormal wavelet coefficients; the optimality is the direct consequence...

Continued fractions with sequences of partial quotients over the field of Laurent series

Xue Hai Hu, Jun Wu (2009)

Acta Arithmetica

Continuous dependence on parameters of certain self-affine measures, and their singularity

Daoxin Ding (2011)

Czechoslovak Mathematical Journal

In this paper, we first prove that the self-affine sets depend continuously on the expanding matrix and the digit set, and the corresponding self-affine measures with respect to the probability weight behave in much the same way. Moreover, we obtain some sufficient conditions for certain self-affine measures to be singular.

Convergence and uniqueness problems for Dirichlet forms on fractals

Roberto Peirone (2000)

Bollettino dell'Unione Matematica Italiana

$M_{1}$ è un particolare operatore di minimizzazione per forme di Dirichlet definite su un sottoinsieme finito di un frattale $K$ che è, in un certo senso, una sorta di frontiera di $K$ . Viene talvolta chiamato mappa di rinormalizzazione ed è stato usato per definire su $K$ un analogo del funzionale $u \mapsto \int {|grad u|}^{2}$ e un moto Browniano. In questo lavoro si provano alcuni risultati sull'unicità dell'autoforma (rispetto a $M_{1}$ ), e sulla convergenza dell'iterata di $M_{1}$ rinormalizzata. Questi risultati sono collegati con l'unicità...

Coordinate $d$ -dimension prints.

Lee, Hung Hwan, Baek, In Soo (1995)

International Journal of Mathematics and Mathematical Sciences

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