Inverse boundary value problem of determining up to second order tensors appear in the lower order perturbations of the polyharmonic operator

Abstract

We consider the following perturbed polyharmonic operator (x,D) of order 2m defined in a bounded domain ⊂ Rn, n≥ 3 with smooth boundary, as equation* (x,D) (-)m + Σj,k=1nAjk DjDk + Σj=1nBj Dj + q(x), equation* where A is a symmetric 2-tensor field, B and q are vector field and scalar potential respectively. We show that the coefficients A=[Ajk], B=(Bj) and q can be recovered from the associated Dirichlet-to-Neumann data on the boundary. Note that, this result shows an example of determining higher order (2nd order) symmetric tensor field in the class of inverse boundary value problem.