广义函数代数上的随机伯努利方程

Pub Date : 2023-12-08 DOI:10.1007/s11253-023-02258-8
Hafedh Rguigui
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引用次数: 0

摘要

基于有限类型的θ-指数增长的全函数空间的拓扑对偶空间({\mathcal{F}}_{\theta }^{*}left({\mathcal{S}{\prime}}_{\mathbb{C}}right)\ )、通过使用 \({\mathcal{F}}_{\theta }^{*}left({\mathcal{S}{\prime}}_{\mathbb{C}}\right)\ 中元素的 Wick 积,我们引入了广义随机伯努利-威克微分方程(或广义函数代数上的随机伯努利方程)。这个方程是随机分布的经典伯努利微分方程的无穷维类似方程。这个随机微分方程由几个例子求解和举例说明。
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Stochastic Bernoulli Equation on the Algebra of Generalized Functions

Based on the topological dual space \({\mathcal{F}}_{\theta }^{*}\left({\mathcal{S}{\prime}}_{\mathbb{C}}\right)\) of the space of entire functions with θ-exponential growth of finite type, we introduce a generalized stochastic Bernoulli–Wick differential equation (or a stochastic Bernoulli equation on the algebra of generalized functions) by using the Wick product of elements in \({\mathcal{F}}_{\theta }^{*}\left({\mathcal{S}{\prime}}_{\mathbb{C}}\right)\). This equation is an infinite-dimensional analog of the classical Bernoulli differential equation for stochastic distributions. This stochastic differential equation is solved and exemplified by several examples.

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