Convergence rates for Tikhonov regularization of a coefficient identification problem

Abstract

This paper investigates the convergence rates for Tikhonov regularization of the problem for identifying the coefficient a ⁢ ( x ) ∈ L ∞ ⁢ ( Ω ) in the frequency-domain acoustic wave equation − div ⁢ ( a ⁢ ∇ u ) − b ⁢ u = f in general dimensional spaces; here x ∈ Ω ⊂ R d , d ≥ 1 , and b ⁢ ( x ) > 0 . We assume that we know the imprecise measurement data of 𝑢 in the subdomain Ω 1 ⊂ Ω with a measurement error of level δ > 0 , while 𝑢 satisfies the general Robin boundary condition on ∂ Ω 1 . We propose to regularize this problem by minimizing a new functional and prove that the functional attains a unique global minimum on the admissible set of a ⁢ ( x ) . Furthermore, we derive the convergence rate O ⁢ ( δ ) for the Tikhonov regularized solution with an easily satisfied source condition.