无界谱算子的标量本质可积局部凸向量值形式的stokes型积分方程

IF 0.6 Q3 MATHEMATICS

Eurasian Mathematical Journal Pub Date : 2020-10-06 DOI:10.32523/2077-9879-2021-12-3-78-89

Benedetto Silvestri

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引用次数: 1

摘要

本文建立了可定向光滑流形上标量本质可积形式的stokes型积分等式，其值在局部凸线性空间$\langle B(G)，\sigma(B(G)，\mathcal{N})\rangle$中，其中$G$是复Banach空间，$\mathcal{N}$是$B(G)$范数对偶的合适线性子空间。这个结果广泛地扩展了我们之前的一篇文章中陈述的牛顿-莱布尼茨型等式。为了得到我们的等式，我们推广了那篇文章的主要结果，并应用了在前文中建立的光滑局部凸向量值形式的Stokes定理。有两个事实值得注意。首先，等式所涉及的积分形式是$G$中可能无界的标量型谱算子的函数。其次，这些形式不必是光滑的，甚至不必是连续可微的。

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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STOKES-TYPE INTEGRAL EQUALITIES FOR SCALARLY ESSENTIALLY INTEGRABLE LOCALLY CONVEX VECTOR-VALUED FORMS WHICH ARE FUNCTIONS OF AN UNBOUNDED SPECTRAL OPERATOR

In this work we establish a Stokes-type integral equality for scalarly essentially integrable forms on an orientable smooth manifold with values in the locally convex linear space $\langle B(G),\sigma(B(G),\mathcal{N})\rangle$, where $G$ is a complex Banach space and $\mathcal{N}$ is a suitable linear subspace of the norm dual of $B(G)$. This result widely extends the Newton-Leibnitz-type equality stated in one of our previous articles. To obtain our equality we generalize the main result of that article, and employ the Stokes theorem for smooth locally convex vector valued forms established in a prodromic paper. Two facts are remarkable. Firstly the forms integrated involved in the equality are functions of a possibly unbounded scalar type spectral operator in $G$. Secondly these forms need not be smooth nor even continuously differentiable.

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来源期刊

Eurasian Mathematical Journal MATHEMATICS-

CiteScore

1.70

自引率

50.00%

发文量

期刊介绍： Publication of carefully selected original research papers in all areas of mathematics written by mathematicians first of all from Europe and Asia. However papers by mathematicians from other continents are also welcome. From time to time Eurasian Mathematical Journal will also publish survey papers.