Mathematical Notes.
Vol. 111.
2022.
P. 913-924
C-Algebras of Transmission Problems and Elliptic Boundary Value Problems with Shift Operators
Abstract: We study the Fredholm solvability for a new class of nonlocal boundary value problems associated with group actions on smooth manifolds. Namely, we consider the case in which the group action is defined on an ambient manifold without boundary and does not preserve the manifold with boundary on which the problem is stated. In particular, the group action does not map the boundary into itself. The orbits of the boundary under the group action split the manifold into subdomains, and this decomposition, being combined with the C*-algebra techniques, plays an important role in our approach to the analysis of the problem. © 2022, Pleiades Publishing, Ltd.
Authors
Baldare A.1
,
Nazaikinskii V.E.2
,
Savin A.Y.
3
,
Schrohe E.
1
Journal
Number of issue
5-6
Language
English
Pages
701-721
Status
Published
Link
Volume
111
Year
2022
Organizations
- 1 Institute of Analysis, Leibniz University, Hannover, 30167, Germany
- 2 Ishlinsky Institute for Problems in Mechanics of Russian Academy of Sciences, Moscow, 119526, Russian Federation
- 3 RUDN University, Moscow, 117198, Russian Federation
Keywords
C*-algebra; crossed product; ellipticity; Fredholm property; group action; manifold with boundary; nonlocal operator
Date of creation
06.07.2022
Date of change
06.07.2022
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Mathematical Notes.
Vol. 111.
2022.
P. 970-976