Дробно-Устойчивая Статистика Экспрессии Генов В Экспериментальных Данных Секвенирования Нового Поколения

The problem of calculating the probability density and distribution function of a strictly stable law is considered at x→0. The expansions of these values into power series were obtained to solve this problem. It was shown that in the case α<1, the obtained series were asymptotic at x→0; in the case α>1, they were convergent; and in the case α=1 in the domain |x|<1, these series converged to an asymmetric Cauchy distribution. It has been shown that at x→0 the obtained expansions can be successfully used to calculate the probability density and distribution function of strictly stable laws.

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The Calculation of the Density and Distribution Functions of Strictly Stable Laws

Saenko

2020

Mathematics

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Integral representations for the probability density and distribution function of a strictly stable law with the characteristic function in the Zolotarev’s “C” parametrization were obtained in the paper. The obtained integral representations express the probability density and distribution function of standard strictly stable laws through a definite integral. Using the methods of numerical integration, the obtained integral representations allow us to calculate the probability density and distribution function of a strictly stable law for a wide range of admissible values of parameters ( α , θ ) . A number of cases were given when numerical algorithms had difficulty in calculating the density. Formulas were given to calculate the density and distribution function with an arbitrary value of the scale parameter λ .

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Дробно-Устойчивая Статистика Экспрессии Генов В Экспериментальных Данных Секвенирования Нового Поколения

Cited by 3 publications

References 24 publications

Conformal Accelerations Method and Efficient Evaluation of Stable Distributions

Conformal Accelerations Method and Efficient Evaluation of Stable Distributions

The Calculation of the Probability Density and Distribution Function of a Strictly Stable Law in the Vicinity of Zero

The Calculation of the Density and Distribution Functions of Strictly Stable Laws

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