Proceedings PaperFractional derivation and behavior of the punctuation of the torus at infinity
|Format||Member Price||Non-Member Price|
In this paper the classical notion of resistance is considered with a geometrical view. First order processes are considered through the scope of their state trajectory. By applying a geometrical procedure, the resistance can be seen as the deviation between two points on border of an hyperbolic space. The same procedure is then applied to the Cole-Cole expressions, typical of fractal media phenomena. In spite of the abandon of transformation group structure, the notion of resistance takes a wide sense, linked not only to a deviation of the border, but also coming from the thickness of this border.