Local energy decay for the wave equation with a time-periodic non-trapping metric and moving obstacle
-
Yavar Kian
yavar.Kian@cpt.univ-mrs.fr
Downloads
DOI:
https://doi.org/10.4067/s0719-06462012000200008Abstract
Consider the mixed problem with Dirichelet condition associated to the wave equation ∂ 2t u − divx(É‘(t, x)∇x u) = 0, where the scalar metric É‘(t, x) is T-periodic in t and uniformly equal to 1 outside a compact set in x, on a T-periodic domain. Let ð˜œ(t, 0) be the associated propagator. Assuming that the perturbations are non-trapping, we prove the meromorphic continuation of the cut-off resolvent of the Floquet operator ð˜œ(T, 0) and we establish sufficient conditions for local energy decay.
Keywords
Similar Articles
- Ricardo Castro Santis, Fernando Córdova-Lepe, Ana Belén Venegas, Biorreactor de fermentación con tasa estocástica de consumo , CUBO, A Mathematical Journal: Vol. 27 No. 2 (2025): Spanish Edition (40th Anniversary)
- Aníbal Coronel, Fernando Huancas, Esperanza Lozada, Jorge Torres, Análisis matemático de un problema inverso para un sistema de reacción-difusión originado en epidemiología , CUBO, A Mathematical Journal: Vol. 27 No. 2 (2025): Spanish Edition (40th Anniversary)
- Raoudha Laffi, Some inequalities associated with a partial differential operator , CUBO, A Mathematical Journal: Vol. 27 No. 3 (2025)
You may also start an advanced similarity search for this article.
Downloads
Download data is not yet available.
Published
2012-06-01
How to Cite
[1]
Y. Kian, “Local energy decay for the wave equation with a time-periodic non-trapping metric and moving obstacle”, CUBO, vol. 14, no. 2, pp. 153–173, Jun. 2012.
Issue
Section
Articles
