Abstract
Nonlinear filters are designed to generate stationary stochastic processes with the knowledge of their spectral densities and first-order probability densities. Two types of spectral densities are considered: the low-pass type and the narrow-band type. In particular, the nonlinear filters are represented in the form of Itô stochastic differential equations, in which the drift coefficients are adjusted to match the spectral density, and the diffusion coefficients are determined according to the probability distribution. The scheme can be used to generate excitation random processes which are clearly non-Gaussian. Since such excitations are described by stochastic differential equations, they can be combined with the governing equations of the excited dynamical systems in analytical investigation, or as a basis for Monte Carlo simulation.KeywordsProbability DensitySpectral DensityRandom ProcessStochastic Differential EquationRandom ExcitationThese keywords were added by machine and not by the authors. This process is experimental and the keywords may be updated as the learning algorithm improves.
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