Uniqueness in Calder\'on's problem for conductivities with unbounded gradient

Abstract

We prove uniqueness in the inverse conductivity problem for uniformly elliptic conductivities in Ws,p(), where ⊂ Rn is Lipschitz, 3≤ n ≤ 6, and s and p are such that Ws,p() ⊂ W1,∞(). In particular, we obtain uniqueness for conductivities in W1,n() (n=3,4). This improves on the result of the author and Tataru, who assumed that the conductivity is Lipschitz.