Extended-domain-eigenfunction method (EDEM): a study of ill posedness and regularization

The extended-domain-eigenfunction method (EDEM) proposed for solving elliptic boundary value problems on annular-like domains requires an inversion process. The procedure thus represents an ill-posed problem, whose numerical solution involves an ill-conditioned system of equations. In this paper, the ill-posed nature of EDEM is studied and numerical solutions based on regularization schemes are considered. It is shown that the EDEM solution methodology lends itself naturally to a formulation in terms of the well-known iterative Landweber method and the more general and faster converging semiiterative regularization schemes. Theoretical details and numerical results of the regularization schemes are presented for the case of the two-dimensional Laplace operator on annular domains. PACS numbers: 02.60.Jr, 02.60.Cb, 02.30.Nw, 02.30.Lt, 02.30.Zz, 47.15.Hg Mathematics Subject Classification: 35J05, 35J65, 65F15 (Some figures may appear in colour only in the online journal)