The Scattering and Emissivity of rough surfaces involve solutions to non-linear differential equations. Different approaches have been used in the literature to obtain approximate solutions under some hypothesis. For example Kirchhoff solution is used when the roughness is gentle on the scale of the wavelength. In this paper the Method of Moments is used to analyze the scattering of arbitrary surfaces. No approximation about the scale roughness is necessary. Both Gaussian and Fractal surfaces have been modeled and compared. The introduction of fractal geometry provides a new tool to describe natural rough surfaces. A first inside to the properties and parameters that describe fractal geometry has been done in order to characterize them sta...
The concept of "surface modeling" generally describes the process of representing a physical or arti...
In this paper the scattering of electromagnetic (EM) waves, emitted by a monostatic radar, from roug...
The two-dimensional fractional Brownian motion (fBm) fractal model has proved to be very suitable fo...
The Scattering and Emissivity of rough surfaces involve solutions to non-linear differential equatio...
Abstract: Now there are two general approaches of scattering on the statistically rough surface: me...
The average coefficient of light scattering by surface fractal structures is calculated within the l...
A twodimensional fractional Brown motion fBm fractal model is presented which is suitable for desc...
International audienceWe present a method to recover a fractal dimension of a multi-scale rough surf...
Fractal geometry provides reliable models to describe geometrical properties of natural surfaces. Th...
Fractal geometry is widely accepted as an efficient theory for the characterization of natural surfa...
Many surfaces in nature are rough. A rough surface can be defined as a surface that has a fractal di...
This article examines fractals with reference to random models of natural surfaces, highlighting the...
In this paper, rough surfaces are modeled based on the WM(Weierstrass-Mandelbrot) fractal function a...
In recent years, it has been shown that use of the Kirchhoff approximation allows expressing the fie...
We argue that a finite iteration of any surface fractal can be composed of mass-fractal iterations o...
The concept of "surface modeling" generally describes the process of representing a physical or arti...
In this paper the scattering of electromagnetic (EM) waves, emitted by a monostatic radar, from roug...
The two-dimensional fractional Brownian motion (fBm) fractal model has proved to be very suitable fo...
The Scattering and Emissivity of rough surfaces involve solutions to non-linear differential equatio...
Abstract: Now there are two general approaches of scattering on the statistically rough surface: me...
The average coefficient of light scattering by surface fractal structures is calculated within the l...
A twodimensional fractional Brown motion fBm fractal model is presented which is suitable for desc...
International audienceWe present a method to recover a fractal dimension of a multi-scale rough surf...
Fractal geometry provides reliable models to describe geometrical properties of natural surfaces. Th...
Fractal geometry is widely accepted as an efficient theory for the characterization of natural surfa...
Many surfaces in nature are rough. A rough surface can be defined as a surface that has a fractal di...
This article examines fractals with reference to random models of natural surfaces, highlighting the...
In this paper, rough surfaces are modeled based on the WM(Weierstrass-Mandelbrot) fractal function a...
In recent years, it has been shown that use of the Kirchhoff approximation allows expressing the fie...
We argue that a finite iteration of any surface fractal can be composed of mass-fractal iterations o...
The concept of "surface modeling" generally describes the process of representing a physical or arti...
In this paper the scattering of electromagnetic (EM) waves, emitted by a monostatic radar, from roug...
The two-dimensional fractional Brownian motion (fBm) fractal model has proved to be very suitable fo...