We consider the identification of a nonlinear corrosion profile from single voltage boundary
data and show injectivity of the parameter-to-output map. We demonstrate that Tikhonov
regularization can be applied in order to solve the inverse problem in a stable manner
despite the presence of noisy data. In combination with a logarithmic stability estimate
for the underlying Cauchy problem, rates for the convergence of the regularized solutions
are proven using a source condition that does not involve the FreĢchet derivative of the
parameter-to-output map. We present sufficient conditions for the existence of a source
function and illustrate our approach by means of numerical examples
