Joint BCAM-UPV/EHU Analysis and PDE seminar: Friedlander comparison theorem for the eigenvalues of the Stokes operator

Data: Og, Eka 24 2021

Ordua: 12:00

Hizlariak: Clément Denis

We prove a comparison theorem for the eigenvalues of the Dirichlet and Neu mann Stokes operators: Let AN and AD be the Neumann Stokes operator and Dirichlet Stokes operator. respectively, and let λN1 ≤ λN2 ≤ . . . and λD1 ≤ λD2 ≤ . . . be the eigenvalues of AN and AD repeated with multiplicity, respectively. Then 
λNn+1 < λDn
for all n ∈ N.
There is a simple relation between the eigenvalues of the Stokes operator with Robin boundary conditions and the Dirichlet-to-Neumann operator associated with the Stokes operator. Using results by ter Elst and Arendt on Dirichlet-to Neumann graphs to avoid any issues when the Dirichlet-to-Neumann operator is ill-defined, we study the flow of the eigenvalues between the Stokes-Dirichlet and Stokes-Neumann operators, allowing us to prove that the eigenvalue estimate holds if the Dirichlet-to-Neumann graph has a negative eigenvalue.

From joint work with Tom ter Elst (Auckland University)

Link to the session:

More info at


Aix - Marseille Université

Hizlari baieztatuak:

Clément Denis

Ez da ekiltaldirik aurkitu.