RUS  ENG
Полная версия
ЖУРНАЛЫ // Eurasian Mathematical Journal // Архив

Eurasian Math. J., 2021, том 12, номер 3, страницы 78–89 (Mi emj416)

Stokes-type integral equalities for scalarly essentially integrable locally convex vector-valued forms which are functions of an unbounded spectral operator

B. Silvestri

Dipartimento di Matematica Pura ed Applicata, Universita' degli Studi di Padova, Via Trieste, 63, 35121 Padova, Italy

Аннотация: 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 those articles, and employ the Stokes theorem for smooth locally convex vector-valued forms established there. Two facts are remarkable. First, 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.

Ключевые слова и фразы: unbounded spectral operators in Banach spaces, functional calculus, integration of locally convex vector-valued forms on manifolds, Stokes equalities.

MSC: 46G10, 47B40, 47A60, 58C35

Поступила в редакцию: 09.01.2021

Язык публикации: английский

DOI: 10.32523/2077-9879-2021-12-3-78-89



Реферативные базы данных:


© МИАН, 2024