On Wick calculus and its relationship with stochastic integration on spaces of regular test functions in the Lévy white noise analysis

IF 1 Q1 MATHEMATICS Carpathian Mathematical Publications Pub Date : 2022-06-23 DOI:10.15330/cmp.14.1.194-212
N. A. Kachanovsky
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Abstract

We deal with spaces of regular test functions in the Lévy white noise analysis, which are constructed using Lytvynov's generalization of a chaotic representation property. Our aim is to study properties of Wick multiplication and of Wick versions of holomorphic functions, and to describe a relationship between Wick multiplication and integration, on these spaces. More exactly, we establish that a Wick product of regular test functions is a regular test function; under some conditions a Wick version of a holomorphic function with an argument from the space of regular test functions is a regular test function; show that when employing the Wick multiplication, it is possible to take a time-independent multiplier out of the sign of an extended stochastic integral with respect to a Lévy process; establish an analog of this result for a Pettis integral (a weak integral); obtain a representation of the extended stochastic integral via formal Pettis integral from the Wick product of the original integrand by a Lévy white noise. As an example of an application of our results, we consider an integral stochastic equation with Wick multiplication.
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l白噪声分析中Wick微积分及其与正则测试函数空间上随机积分的关系
我们处理l白噪声分析中的正则测试函数的空间,这些空间是利用Lytvynov对混沌表示性质的推广构造的。我们的目的是研究全纯函数的Wick乘法和Wick版本的性质,并描述在这些空间上的Wick乘法和积分之间的关系。更确切地说,我们建立了正则测试函数的Wick积是正则测试函数;在某些条件下,具有正则测试函数空间参数的全纯函数的Wick版本是正则测试函数;证明当采用Wick乘法时,可以从扩展的随机积分的符号中取一个与时间无关的乘子,这是相对于lsamvy过程的;对Pettis积分(弱积分)建立类似的结果;由原始被积函数的Wick积通过l白噪声得到扩展随机积分的形式Pettis积分表示。作为应用我们的结果的一个例子,我们考虑了一个带Wick乘法的积分随机方程。
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来源期刊
CiteScore
1.90
自引率
12.50%
发文量
31
审稿时长
25 weeks
期刊最新文献
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