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A Faber-Krahn inequality for the Riesz potential operator for triangles and quadrilaterals
Abstract
We prove an analog of the FaberâKrahn inequality for the Riesz potential operator. The proof is based on Rieszâs inequality under Steiner symmetrization and the continuity of the first eigenvalue of the Riesz potential operator with respect to the convergence, in the complementary Hausdorff distance, of a family of uniformly bounded non-empty convex open sets.
Más información
| Título según WOS: | A Faber-Krahn inequality for the Riesz potential operator for triangles and quadrilaterals |
| Título según SCOPUS: | A FaberâKrahn inequality for the Riesz potential operator for triangles and quadrilaterals |
| Título de la Revista: | Journal of Spectral Theory |
| Volumen: | 11 |
| Número: | 4 |
| Editorial: | European Mathematical Society Publishing House |
| Fecha de publicación: | 2021 |
| Página final: | 1951 |
| Idioma: | English |
| DOI: |
10.4171/JST/390 |
| Notas: | ISI, SCOPUS |