无穷维高斯变量变化公式

Q2 Mathematics

Annali dell''Universita di Ferrara Pub Date : 2024-02-05 DOI:10.1007/s11565-024-00490-z

Claudio Asci

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引用次数: 0

摘要

在本文中，我们研究了有界实数序列的巴拿赫空间（\ell _{\infty }\) ，以及在 \(\left( \textbf{R}^\{infty },\mathcal {B}^{\infty }\right) 上类似于有限维高斯定律的度量 \(N(a,\Gamma )\) 。我们这篇论文的主要结果是关于 \(left( E_{\infty },\mathcal {B}^{\infty }\left( E_{\infty }\right) \)上可测实数函数关于 \(N(a,\Gamma )\) 的积分的变量变化公式，其中 \(E_{\infty }\) 是收敛实数序列的可分离巴纳赫空间。这种变量变化是由\(\left( m,\sigma \right) \)函数给出的，这些函数定义在\(E_{\infty }\) 的子集上，其值在\(E_{\infty }\)上，其性质与有限维差分变形的性质类似。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Infinite-dimensional Gaussian change of variables’ formula

In this paper, we study the Banach space \(\ell _{\infty }\) of the bounded real sequences, and a measure \(N(a,\Gamma )\) over \(\left( \textbf{R}^{\infty },\mathcal {B}^{\infty }\right) \) analogous to the finite-dimensional Gaussian law. The main result of our paper is a change of variables’ formula for the integration, with respect to \(N(a,\Gamma )\), of the measurable real functions on \(\left( E_{\infty },\mathcal {B}^{\infty }\left( E_{\infty }\right) \right) \), where \(E_{\infty }\) is the separable Banach space of the convergent real sequences. This change of variables is given by some \(\left( m,\sigma \right) \) functions, defined over a subset of \(E_{\infty }\), with values on \(E_{\infty }\), with properties that generalize the analogous ones of the finite-dimensional diffeomorphisms.

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来源期刊

Annali dell''Universita di Ferrara Mathematics-Mathematics (all)

CiteScore

1.70

自引率

0.00%

发文量

期刊介绍： Annali dell''Università di Ferrara is a general mathematical journal publishing high quality papers in all aspects of pure and applied mathematics. After a quick preliminary examination, potentially acceptable contributions will be judged by appropriate international referees. Original research papers are preferred, but well-written surveys on important subjects are also welcome.