AbstractWe present a topological characterization of the Sierpiński triangle. This answers question 58 from the Problem book of the Open Problem Seminar held at Charles University. In fact we give a characterization of the Apollonian gasket first. Consequently we show that any subcontinuum of the Apollonian gasket, whose boundary consists of three points, is homeomorphic to the Sierpiński triangle
In the article the relation between irreducible curve plane singularities and knots is described. In...
We investigate a homeomorphism problem on a class of self-similar sets called generalized Sierpi\'ns...
The Sierpinski gasket admits a locally isometric ramified self-covering. A semifinite spectral tripl...
AbstractWe present a topological characterization of the Sierpiński triangle. This answers question ...
AbstractGeneralised Sierpiński carpets are planar sets that generalise the well-known Sierpiński car...
AbstractThis paper answers positively the open question of whether or not the Sierpiński curve is ho...
In this paper, we study the topological behavior of elementary planes in theApollonian orbifold $M_A...
AbstractWe study a family of rational maps acting on the Riemann sphere with a single preperiodic cr...
The iterative procedure of removing “almost everything” from a triangle ultimately leading to the Si...
The classical Sierpinski Gasket defined on the equilateral triangle is a typical example of fractals...
We define a Markov chain on a discrete symbolic space corresponding to the Sierpinski gasket (SG) and...
We generalize the construction of the ordinary Sierpinski triangle to obtain a two-parameter family ...
In this thesis, we present solutions to several problems concerning one-dimensi- onal continua. We g...
Sierpiński graphs S(n, k) were defined originally in 1997 by Sandi Klavžar and Uroš Milutinović. In ...
Inverse limits are a tool to construct spaces with curious topological properties, from very simple ...
In the article the relation between irreducible curve plane singularities and knots is described. In...
We investigate a homeomorphism problem on a class of self-similar sets called generalized Sierpi\'ns...
The Sierpinski gasket admits a locally isometric ramified self-covering. A semifinite spectral tripl...
AbstractWe present a topological characterization of the Sierpiński triangle. This answers question ...
AbstractGeneralised Sierpiński carpets are planar sets that generalise the well-known Sierpiński car...
AbstractThis paper answers positively the open question of whether or not the Sierpiński curve is ho...
In this paper, we study the topological behavior of elementary planes in theApollonian orbifold $M_A...
AbstractWe study a family of rational maps acting on the Riemann sphere with a single preperiodic cr...
The iterative procedure of removing “almost everything” from a triangle ultimately leading to the Si...
The classical Sierpinski Gasket defined on the equilateral triangle is a typical example of fractals...
We define a Markov chain on a discrete symbolic space corresponding to the Sierpinski gasket (SG) and...
We generalize the construction of the ordinary Sierpinski triangle to obtain a two-parameter family ...
In this thesis, we present solutions to several problems concerning one-dimensi- onal continua. We g...
Sierpiński graphs S(n, k) were defined originally in 1997 by Sandi Klavžar and Uroš Milutinović. In ...
Inverse limits are a tool to construct spaces with curious topological properties, from very simple ...
In the article the relation between irreducible curve plane singularities and knots is described. In...
We investigate a homeomorphism problem on a class of self-similar sets called generalized Sierpi\'ns...
The Sierpinski gasket admits a locally isometric ramified self-covering. A semifinite spectral tripl...