Hybridized discontinuous Galerkin method for elliptic interface problems

Abstract

New hybridized discontinuous Galerkin (HDG) methods for the interface problem for elliptic equations are proposed. Unknown functions of our schemes are uh in elements and uh on inter-element edges. That is, we formulate our schemes without introducing the flux variable. Our schemes naturally satisfy the Galerkin orthogonality. The solution u of the interface problem under consideration may not have a sufficient regularity, say u|Ω1∈ H2(Ω1) and u|Ω2∈ H2(Ω2), where Ω1 and Ω2 are subdomains of the whole domain Ω and Γ=∂Ω1∂Ω2 implies the interface. We study the convergence, assuming u|Ω1∈ H1+s(Ω1) and u|Ω2∈ H1+s(Ω2) for some s∈ (1/2,1], where H1+s denotes the fractional order Sobolev space. Consequently, we succeed in deriving optimal order error estimates in an HDG norm and the L2 norm. Numerical examples to validate our results are also presented.