We show that the knowledge of the Dirichlet-to-Neumann map on the boundary of
a bounded open set in Rn for the perturbed polyharmonic operator
(−Δ)m+q with q∈Ln/2m, n>2m, determines the potential q in
the set uniquely. In the course of the proof, we construct a special Green
function for the polyharmonic operator and establish its mapping properties in
suitable weighted L2 and Lp spaces. The Lp estimates for the special
Green function are derived from Lp Carleman estimates with linear weights
for the polyharmonic operator