Add to ORKGThe Mandelbrot set M is a subset of the parameter plane for iteration of the complex quadratic polynomial Q c ( z ) = z 2 + c . M consists of those c values for which the orbit of 0 is bounded. This set features a basic cardioid shape from which hang numerous 'bulbs' or 'decorations'. Each of these bulbs is a large disk that is directly attached to the main cardioid together with numerous other smaller bulbs and a prominent 'antenna'. In this thesis we study the geometry of bulbs and some 'folk theorems' about the geometry of bulbs involving spokes of the antenna
Agraïments: The second author is partially supported by the Polish NCN grant decision DEC-2012/06/M/...
With computers, we are able to construct complicated fractal im-ages that describe the dynamics of c...
We show small Mandelbrot sets are dense in the bifurcation locus for any holomorphic family of ratio...
Abstract In this paper, we give a brief overview of the geometry of the Mandelbrot set. We show how ...
Abstract. This paper provides a description for the quadratic polynomials on the boundary of the Man...
We provide an analytic estimate for the size of the bulbs adjoining the main cardioid of the Mandelb...
We provide an analytic estimate for the size of the bulbs adjoining the main cardioid of the Mandelb...
En este trabajo de grado se muestra una introducción a los sistemas dinámicos, a través del estudio...
We consider the complex dynamics of a one parameter family of polynomials of type Ed [1], as fc(z) ...
Working within the polynomial quadratic family, we introduce a new point of view on bifurcations whi...
Non-random complicated motions can exhibit a very rapid growth of errors and, despite perfect determ...
Understanding the geometry of the Mandelbrot set has been a central pillar of holomorphic dynamics o...
McMullen in 2000 proved that copies of generalized Mandelbrot set are dense in the bifurcation locus...
Abstract. We use a commutative generalization of complex numbers called bicomplex numbers to introdu...
We give a new proof that all external rays of the Mandelbrot set at rational angles land, and of the...
Agraïments: The second author is partially supported by the Polish NCN grant decision DEC-2012/06/M/...
With computers, we are able to construct complicated fractal im-ages that describe the dynamics of c...
We show small Mandelbrot sets are dense in the bifurcation locus for any holomorphic family of ratio...
Abstract In this paper, we give a brief overview of the geometry of the Mandelbrot set. We show how ...
Abstract. This paper provides a description for the quadratic polynomials on the boundary of the Man...
We provide an analytic estimate for the size of the bulbs adjoining the main cardioid of the Mandelb...
We provide an analytic estimate for the size of the bulbs adjoining the main cardioid of the Mandelb...
En este trabajo de grado se muestra una introducción a los sistemas dinámicos, a través del estudio...
We consider the complex dynamics of a one parameter family of polynomials of type Ed [1], as fc(z) ...
Working within the polynomial quadratic family, we introduce a new point of view on bifurcations whi...
Non-random complicated motions can exhibit a very rapid growth of errors and, despite perfect determ...
Understanding the geometry of the Mandelbrot set has been a central pillar of holomorphic dynamics o...
McMullen in 2000 proved that copies of generalized Mandelbrot set are dense in the bifurcation locus...
Abstract. We use a commutative generalization of complex numbers called bicomplex numbers to introdu...
We give a new proof that all external rays of the Mandelbrot set at rational angles land, and of the...
Agraïments: The second author is partially supported by the Polish NCN grant decision DEC-2012/06/M/...
With computers, we are able to construct complicated fractal im-ages that describe the dynamics of c...
We show small Mandelbrot sets are dense in the bifurcation locus for any holomorphic family of ratio...