Homogenization of a thermal problem with flux jump (Q727488)

In the framework of homogenization theory the authors study two elliptic equations in divergence form in two domain \(\Omega_1^\varepsilon\) and \(\Omega_2^\varepsilon\). The main goal of the paper consists in the presence of a jump in the thermal flux across the imperfect interface between \(\Omega_1^\varepsilon\) and \(\Omega_2^\varepsilon\). The homogenization result is presented together with the corrector terms. The proofs are obtained using the properties of the unfolding operators.