Characterization of minimizers of an anisotropic variant of the Rudin-Osher-Fatemi functional with L1 fidelity term

Abstract

In this paper we study an anisotropic variant of the Rudin-Osher-Fatemi functional with L1 fidelity term of the form \[ E(u) = ∫Rn φ(∇ u) + λ \| u -f \|L1(Rn). \] We will characterize the minimizers of E in terms of the Wulff shape of φ and the dual anisotropy. In particular we will calculate the subdifferential of E. We will apply this characterization to the special case φ = |·|1 and n=2, which has been used in the denoising of 2D bar codes. In this case, we determine the shape of a minimizer u when f is the characteristic function of a circle.