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Elements of Potential Theory on Carnot Groups
- Source :
- Functional Analysis and Its Applications. 52:158-161
- Publication Year :
- 2018
- Publisher :
- Springer Science and Business Media LLC, 2018.
-
Abstract
- We propose and study elements of potential theory for the sub-Laplacian on homogeneous Carnot groups. In particular, we show the continuity of the single-layer potential and establish Plemelj-type jump relations for the double-layer potential. As a consequence, we derive a formula for the trace on smooth surfaces of the Newton potential for the sub-Laplacian. Using this, we construct a sub-Laplacian version of Kac’s boundary value problem.
- Subjects :
- Pure mathematics
Trace (linear algebra)
General Mathematics
Mathematics, Applied
homogeneous Carnot group
01 natural sciences
CALCULUS
Potential theory
0101 Pure Mathematics
symbols.namesake
0102 Applied Mathematics
0103 physical sciences
Newton potential
Heisenberg group
Boundary value problem
0101 mathematics
HEISENBERG-GROUP
Mathematics
Dirichlet problem
integral boundary condition
DIRICHLET PROBLEM
Science & Technology
layer potentials
Newtonian potential
sub-Laplacian
Applied Mathematics
010102 general mathematics
KOHN-LAPLACIAN
Physical Sciences
symbols
Jump
010307 mathematical physics
Carnot cycle
Analysis
Subjects
Details
- ISSN :
- 15738485 and 00162663
- Volume :
- 52
- Database :
- OpenAIRE
- Journal :
- Functional Analysis and Its Applications
- Accession number :
- edsair.doi.dedup.....3d26387a09e623aa861174c26cb9ea2c
- Full Text :
- https://doi.org/10.1007/s10688-018-0224-5