Abstract

We study interface (or transmission) problems arising in the steady state heat conduction for layered medium. These problems are related to the elliptic equation of the form Au:=(k(x)u(x))=F(x), xΩ2, with discontinuous coefficient k=k(x). We analyse two types of jump (or contact) conditions across the interfaces Γδ=Ω1Ωδ and Γδ+=ΩδΩ2 of the layered medium Ω:=Ω1ΩδΩ2. An asymptotic analysis of the interface problem is derived for the case when the thickness (2δ>0) of the layer (isolation) Ωδ tends to zero. For each case, the local truncation errors of the used conservative finite difference scheme are estimated on the nonuniform grid. A fast direct solver has been applied for the interface problems with piecewise constant but discontinuous coefficient k=k(x). The presented numerical results illustrate high accuracy and show applicability of the given approach.