Numerical solution of the two-dimensional Calderon problem for domains close to a disk

Abstract

For a compact Riemannian surface (M,g) with non-empty boundary , the Dirichlet-to-Neumann operator (DtN-map) g:C∞() C∞() is defined by gf=.∂ u∂|, where is the unit outer normal vector to the boundary and u is the solution to the Dirichlet problem gu=0,\ u|=f. The Calder\'on problem consists of recovering a Riemannian surface from its DtN-map. It is well known that (M,g) is determined by g uniquely up to a conformal equivalence. We suggest a method for numerical solution of the Calder\'on problem. The method works well at least for Riemannian surfaces (M,g) close to (D,e), where D=\(x,y) x2+y21\ is the unit disk and e=dx2+dy2 is the Euclidean metric. Our numerical examples confirm the statement: the DtN-map is very sensitive to small deviations of the shape of a domain.