Statistical Non-Gaussian Model of Sea Surface with Anisotropic Spectrum for Wave Scattering Theory. Part I

“…With such an interpretation, weights {w n } have the meaning of the probabilities that a realization belongs to a certain nor mal set. Such an approach obviously corresponds to nonergodic poly Gaussian random processes [28] and cannot be used for constructing the models describing uniform roughness profiles.…”

“…The repre sentation of random processes by a combination of Gaussian distributions was analyzed theoretically in [25][26][27], where the completeness of the Gaussian functions in L 2 (-∞, ∞) was proved and the possibility of an arbitrarily exact description of an arbitrary com plex valued function by a finite number of Gaussian components was demonstrated. Poly Gaussian super positions have found wide application in describing random non Gaussian signals and noise for solving problems of laser ranging and approximation of distri butions of random quantities encountered in technical applications [28,29].…”

Poly-Gaussian models of a non-Gaussian randomly rough surface

“…With such an interpretation, weights {w n } have the meaning of the probabilities that a realization belongs to a certain nor mal set. Such an approach obviously corresponds to nonergodic poly Gaussian random processes [28] and cannot be used for constructing the models describing uniform roughness profiles.…”

“…The repre sentation of random processes by a combination of Gaussian distributions was analyzed theoretically in [25][26][27], where the completeness of the Gaussian functions in L 2 (-∞, ∞) was proved and the possibility of an arbitrarily exact description of an arbitrary com plex valued function by a finite number of Gaussian components was demonstrated. Poly Gaussian super positions have found wide application in describing random non Gaussian signals and noise for solving problems of laser ranging and approximation of distri butions of random quantities encountered in technical applications [28,29].…”

Poly-Gaussian models of a non-Gaussian randomly rough surface

“…Existing works on modeling and fitting clutter amplitude distribution include Gaussian based Rayleigh distribution and Compound-Gaussian distributions such as Weibull, Log-normal, and K, etc. [1][2][3][4][5]. Based on these studies, clutter amplitude distribution is further incorporated into design and analysis of constant false alarm ratio (CFAR) system [6,7], small target detection [8], target recognition [9], and so on.…”

A Modified Goodness-of-Fit Measurement for Radar Clutter Amplitude Statistics

Scattering Studies for Two-Dimensional Exponential Correlation Textured Rough Surfaces Using Small-Slope Approximation Method