Theta-functions in mathematical model of noise quantization

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This article presents a new formula for two-dimensional density function probability of noise quantization, which allows us to write it with the help of mathematical expression, which consists of only theta-functions Jacobi. The method of obtaining this formula is given. The derivation is based on the fact that at a suitable change of variables some members of the double row are destroyed. It shows the principle of producing all of the formulas of this family. This principle is based on properties of symmetry theta-function. The symmetry of theta-functions allows us to express one theta-function by another theta-function and obtain other formulas consisting only of theta-functions Jacobi. This family of formulas allows us to obtain expressions for the organization of model experiments, supported by basic mathematical packages. They enable us to receive numerical characteristics of random processes such as the functions of parameters that give rise to their Gaussian random processes in an analytical form. Their use increases the rate of convergence of simulation results. These formulas enable us carry out synthesis of the desired expression in an analytic form for functional transformations of random vectors and processes in signal process.

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Distribution density, noise quantization, theta-functions jacobi

Короткий адрес: https://sciup.org/147160636

IDR: 147160636   |   DOI: 10.14529/cmse180102

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