分数维纳混沌第 1 部分

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS
Elena Boguslavskaya, Elina Shishkina
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引用次数: 0

摘要

在本文中,我们介绍了维纳多项式混沌扩展的分数模拟。需要强调的是,分数阶数与混沌分解元素的阶数有关,而与过程本身无关,后者仍然是标准的维纳过程。在我们的维纳混沌扩展的分数模拟中,核心工具是表示为 \({\mathcal {H}}_\alpha (x,y)\) 的函数,在此称为幂正态化抛物柱面函数。通过仔细分析几个基本的确定性和随机性,我们确认该函数本质上是赫尔墨特多项式的分数扩展。特别是,以维纳过程和时间为参数的幂正态化抛物柱面函数\({\mathcal {H}}_\alpha (W_t,t)\)显示了马丁格尔特性,并可解释为以 1 为积分的分数伊托积分,从而与其非分数对应函数相似。为了在实线上建立多项式维纳混沌的分数类比,我们引入了一个新函数,通过在零点平滑连接两个幂正态化抛物柱面函数,我们称之为扩展赫米特函数。我们将扩展赫米特函数组成一个正交的单参数族,并使用扩展赫米特函数的张量积作为分数维纳混沌展开的构件,就像在维纳混沌多项式展开中使用赫米特多项式的张量积作为构件一样。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Fractional Wiener chaos: Part 1

Fractional Wiener chaos: Part 1

In this paper, we introduce a fractional analogue of the Wiener polynomial chaos expansion. It is important to highlight that the fractional order relates to the order of chaos decomposition elements, and not to the process itself, which remains the standard Wiener process. The central instrument in our fractional analogue of the Wiener chaos expansion is the function denoted as \({\mathcal {H}}_\alpha (x,y)\), referred to herein as a power-normalised parabolic cylinder function. Through careful analysis of several fundamental deterministic and stochastic properties, we affirm that this function essentially serves as a fractional extension of the Hermite polynomial. In particular, the power-normalised parabolic cylinder function with the Wiener process and time as its arguments, \({\mathcal {H}}_\alpha (W_t,t)\), demonstrates martingale properties and can be interpreted as a fractional Itô integral with 1 as the integrand, thereby drawing parallels with its non-fractional counterpart. To build a fractional analogue of polynomial Wiener chaos on the real line, we introduce a new function, which we call the extended Hermite function, by smoothly joining two power-normalized parabolic cylinder functions at zero. We form an orthogonal set of extended Hermite functions as a one-parameter family and use tensor products of the extended Hermite functions as building blocks in the fractional Wiener chaos expansion, in the same way that tensor products of Hermite polynomials are used as building blocks in the Wiener chaos polynomial expansion.

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来源期刊
ACS Applied Bio Materials
ACS Applied Bio Materials Chemistry-Chemistry (all)
CiteScore
9.40
自引率
2.10%
发文量
464
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