Add to ORKGIn complex dynamics we compose a complex valued function with itself repeatedly and observe the orbits of values of that function. Particular interest is in the orbit of critical points of that function (critical orbits). One famous, studied example is the quadratic polynomial Pc(z) = z^2 +c and how changing the value of c makes a difference to the orbit of the critical point z = 0. The set of c values for which the critical orbit is bounded is called the Mandelbrot set. This paper studies rational functions of the form Rn;a;c(z) = z^n + a/z^n + c and their critical orbits. It turns out that for certain fixed values of n, a, and c, Rn;a;c locally behaves like Pc. On those regions Rn;a;c is said to be a degree two polynomial-like map. We the...
A complex point Z0 is defined to be a member of the famous Mandelbrot set fractal when the iterative...
This thesis is a study of the dynamics of rational maps without certain periodic points, focusing on...
This thesis is a study of the dynamics of rational maps without certain periodic points, focusing on...
In complex dynamics we compose a complex valued function with itself repeatedly and observe the orbi...
In complex dynamics we compose a complex valued function with itself repeatedly and observe the orbi...
Complex dynamics involves the study of the behavior of complex-valued functions when they are compos...
Agraïments: The second author is partially supported by the Polish NCN grant decision DEC-2012/06/M/...
McMullen in 2000 proved that copies of generalized Mandelbrot set are dense in the bifurcation locus...
Treballs Finals de Grau de Matemàtiques, Facultat de Matemàtiques, Universitat de Barcelona, Any: 20...
For the family of complex rational maps F_λ(z)=z^n+λ/z^d, where λ is a complex parameter and n, d ≥ ...
We show small Mandelbrot sets are dense in the bifurcation locus for any holomorphic family of ratio...
We study the dynamics of the family of rational maps of the form,λ(z)=λ(z+1zd-1),d≥3,λ∈C\{0}.Among o...
This dissertation focuses on two problems in complex dynamics. The first relates to Newton\u27s meth...
AbstractA useful formula is given for the coefficients of the conformal mapping from the unit disk o...
McMullen in 2000 proved that copies of generalized Mandelbrot set are dense in the bifurcation locus...
A complex point Z0 is defined to be a member of the famous Mandelbrot set fractal when the iterative...
This thesis is a study of the dynamics of rational maps without certain periodic points, focusing on...
This thesis is a study of the dynamics of rational maps without certain periodic points, focusing on...
In complex dynamics we compose a complex valued function with itself repeatedly and observe the orbi...
In complex dynamics we compose a complex valued function with itself repeatedly and observe the orbi...
Complex dynamics involves the study of the behavior of complex-valued functions when they are compos...
Agraïments: The second author is partially supported by the Polish NCN grant decision DEC-2012/06/M/...
McMullen in 2000 proved that copies of generalized Mandelbrot set are dense in the bifurcation locus...
Treballs Finals de Grau de Matemàtiques, Facultat de Matemàtiques, Universitat de Barcelona, Any: 20...
For the family of complex rational maps F_λ(z)=z^n+λ/z^d, where λ is a complex parameter and n, d ≥ ...
We show small Mandelbrot sets are dense in the bifurcation locus for any holomorphic family of ratio...
We study the dynamics of the family of rational maps of the form,λ(z)=λ(z+1zd-1),d≥3,λ∈C\{0}.Among o...
This dissertation focuses on two problems in complex dynamics. The first relates to Newton\u27s meth...
AbstractA useful formula is given for the coefficients of the conformal mapping from the unit disk o...
McMullen in 2000 proved that copies of generalized Mandelbrot set are dense in the bifurcation locus...
A complex point Z0 is defined to be a member of the famous Mandelbrot set fractal when the iterative...
This thesis is a study of the dynamics of rational maps without certain periodic points, focusing on...
This thesis is a study of the dynamics of rational maps without certain periodic points, focusing on...