A Self-Similar Dendrite with One-Point Intersection and Infinite Post-Critical Set

We build an example of a system S of similarities in R^2 whose attractor is a plane dendrite $K\supset [0,1]$ which satisfies one point intersection property, while the post-critical set of the system S is a countable set whose natural projection to K is dense in the middle-third Cantor set.

Keywords:

self-similar set, attractor, post-critically finite open set condition, dendrite,

PDF

___

C. Bandt, N.V. Hung and H. Rao, On the open set condition for self-similar fractals, Proc. Amer. Math. Soc. 134 (2005), 1369-1374
Charatonik J., Charatonik W., Dendrites, Aportaciones Mat. Comun. 22 (1998), 227-253.
Hutchinson, J.E. Fractals and self-similarity. Indiana Univ. Math. J 30, 1981, 713-747
Kigami, J. Analysis on Fractals. Cambridge University Press, 2001
P.A.P. Moran, Additive functions of intervals and Hausdor measure Proc. Cambridge Philos. Soc. 42 (1946), 15-23

Advances in the Theory of Nonlinear Analysis and its Application-Cover

Başlangıç: 2017
Yayıncı: Erdal KARAPINAR

Arşiv

Sayıdaki Diğer Makaleler

Andrei TETENOV, Prabhjot SİNGH

The Uniqueness of Positive Solution for Higher-Order Nonlinear Fractional Differential Equation With Fractional Multi-Point Boundary Conditions

Bouteraa Noureddine, Slimane BENAİCHA

On Ulam stability of the second order linear differential equation

Dorian Popa, Georgiana Pugna, Ioan Rasa

Revisiting the Kannan Type Contractions via Interpolation

Erdal KARAPİNAR

On various multimap classes in the KKM theory and their applications

Sehei PARK