Spectral convergence analysis for the Reissner-Mindlin system
- https://dmi.unife.it/it/eventi/spectral-convergence-analysis-for-the-reissner-mindlin-system
- Spectral convergence analysis for the Reissner-Mindlin system
- 2026-05-29T10:30:00+02:00
- 2026-05-29T12:00:00+02:00
- Seminario del Prof. Davide Buoso (Università del Piemonte Orientale)
Seminario del Prof. Davide Buoso (Università del Piemonte Orientale)
-
Quando
il 29/05/2026 dalle 10:30 alle 12:00
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- Dove Aula 3 - Dipartimento di Matematica e Informatica di Ferrara
- Contatti Prof. Giulio Tralli
Abstract: The Reissner-Mindlin model for the load of a plate can be thought of as a generalization of the classical Kirchhoff-Love model that leads to a biharmonic
problem. After introducing the Stummel-Vainikko set up for the convergence of operators on varying Banach spaces, we will show that the Reissner-Mindlin operator converges to the biharmonic operator in the norm resolvent convergence as the thickness goes to zero, in particular implying the convergence of eigenvalues and spectral projections. Based on a joint work with Francesco Ferraresso.
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