Existence results of two mixed boundary value elliptic PDEs in Rn

Abstract

We study the existence of a solution to the mixed boundary value problem for Helmholtz and Poisson type equations in a bounded Lipschitz domain ⊂RN and in RN for N≥3. The boundary ∂ of is the decomposition of 1,2⊂∂ such that ∂==12=12 and 12=. We have shown that if the Neumann data f2∈ H-12(2) and the Dirichlet data f1∈ H12(1) then the Helmholtz problem with mixed boundary data admits a unique solution. We have also shown the existence of a weak solution to a mixed boundary value problem governed by the Poisson equation with a measure data and the Dirichlet, Neumann data belongs to f1∈ H12(1), f2∈ H-12(2) respectively.