We define the weak intermediate boundary conditions for the triharmonic operator -Delta(3). We analyse the sensitivity of this type of boundary conditions upon domain perturbations. We construct a perturbation (omega(epsilon))(epsilon > 0) of a smooth domain omega of Double-struck capital RN for which the weak intermediate boundary conditions on partial differential omega(epsilon) are not preserved in the limit on partial differential omega, analogously to the Babuska paradox for the hinged plate. Four different boundary conditions can be produced in the limit, depending on the convergence of partial differential omega(epsilon) to partial differential omega. In one particular case, we obtain a 'strange' boundary condition featuring a microscopic energy term related to the shape of the approaching domains. Many aspects of our analysis could be generalised to an arbitrary order elliptic differential operator of order 2m and to more general domain perturbations.
On the spectral instability for weak intermediate triharmonic problems / Ferraresso, Francesco. - In: MATHEMATICAL METHODS IN THE APPLIED SCIENCES. - ISSN 0170-4214. - 45:10(2022), pp. 5864-5891. [10.1002/mma.8144]
On the spectral instability for weak intermediate triharmonic problems
Francesco Ferraresso
2022-01-01
Abstract
We define the weak intermediate boundary conditions for the triharmonic operator -Delta(3). We analyse the sensitivity of this type of boundary conditions upon domain perturbations. We construct a perturbation (omega(epsilon))(epsilon > 0) of a smooth domain omega of Double-struck capital RN for which the weak intermediate boundary conditions on partial differential omega(epsilon) are not preserved in the limit on partial differential omega, analogously to the Babuska paradox for the hinged plate. Four different boundary conditions can be produced in the limit, depending on the convergence of partial differential omega(epsilon) to partial differential omega. In one particular case, we obtain a 'strange' boundary condition featuring a microscopic energy term related to the shape of the approaching domains. Many aspects of our analysis could be generalised to an arbitrary order elliptic differential operator of order 2m and to more general domain perturbations.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.