The aim of the talk is to describe the asymptotic behavior, as epsilon->0, of an el- liptic problem, with weakly converging data, in an "-periodic two component composite with imperfect inclusions of size ". On the interface we prescribe a jump of the solution that depends on a real parameter gamma. The homogenization results, different according to gamma , have as useful application the study of the exact controllability, via HUM method, of a hyperbolic problem set in the same kind of domain and with the same jump condition on the interface.
Homogenization of imperfect transmission problems with weakly converging data
Sara Monsurro
2018-01-01
Abstract
The aim of the talk is to describe the asymptotic behavior, as epsilon->0, of an el- liptic problem, with weakly converging data, in an "-periodic two component composite with imperfect inclusions of size ". On the interface we prescribe a jump of the solution that depends on a real parameter gamma. The homogenization results, different according to gamma , have as useful application the study of the exact controllability, via HUM method, of a hyperbolic problem set in the same kind of domain and with the same jump condition on the interface.File in questo prodotto:
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