In dynamical systems theory one is interested in what happens when one follows a typical orbit: is there some kind of attractor which usually occurs? Dynamical systems become interesting when the transformation suffices to produce interesting behavior.
The orbit of a single point may be a geometrically complex set.
As we discover, dynamical systems are sources of deterministic fractals. The reasons for this are deeply interwined with ifs theory. dociuverse
Shift dynamical system
By studying the orbits of these systems, we will learn more about fractals
dynamics of a simple mobius transformation. Points spiral away from one fixed point and they spiral in towars the other. what happens if the fixed points coincide?
repulsive fixed point
attractive fixed point in the plane
points belonging to an orbit of a mobius transformations on a sphere
We get order by subtracting
subtraction being a more fundamental operation than addition
The interdependence between complex sistemas and how the different slides of the backend of the machine integrates with each by making a clear close look at the aspects of the grid and recognizing how do they interact.
And choosing where to focus. So in the different aspects being stuff client leadgen Closing Social media marketing Advertisement A
