线性非均质随机微分方程的精确高阶矩

Q4 Mathematics

Model Assisted Statistics and Applications Pub Date : 2023-12-27 DOI:10.3233/mas-231435

A. Guidoum, Kamal Boukhetala

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引用次数: 0

摘要

本文研究的是满足一维线性随机微分方程（SDE）且具有非线性时变漂移和扩散系数的随机过程的矩。我们的目标是推导出 nth 精确矩的公式，而不是通过求解 Fokker-Plank 方程或矩生成函数来寻求过渡密度函数，因为后者很难以闭合形式求解。我们将适当地应用伊托公式和具有恒定漂移和扩散项的维纳过程（即高斯过程）的特性，以获得精确的高阶矩。

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Exact higher-order moments for linear non-homogeneous stochastic differential equation

This paper investigates the moments of a stochastic process that satisfies the one-dimensional linear stochastic differential equation (SDE) with nonlinear time-dependent drift and diffusion coefficients. The goal is to derive formulas for the nth exact moment, that instead of seeking the transition density function by solving the Fokker-Plank equations or moment-generating functions, which can be difficult to solve in closed form. We will appropriately apply Itô’s formula and the properties of the Wiener process with a constant drift and diffusion term, which is a Gaussian process to obtain the exact higher-order moments.

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来源期刊

Model Assisted Statistics and Applications Mathematics-Applied Mathematics

CiteScore

1.00

自引率

0.00%

发文量

期刊介绍： Model Assisted Statistics and Applications is a peer reviewed international journal. Model Assisted Statistics means an improvement of inference and analysis by use of correlated information, or an underlying theoretical or design model. This might be the design, adjustment, estimation, or analytical phase of statistical project. This information may be survey generated or coming from an independent source. Original papers in the field of sampling theory, econometrics, time-series, design of experiments, and multivariate analysis will be preferred. Papers of both applied and theoretical topics are acceptable.