A duality based approach to the minimizing total variation flow in the space H-s

Abstract

We consider a gradient flow of the total variation in a negative Sobolev space H-s (0≤ s ≤ 1) under the periodic boundary condition. If s=0, the flow is nothing but the classical total variation flow. If s=1, this is the fourth order total variation flow. We consider a convex variational problem which gives an implicit-time discrete scheme for the flow. By a duality based method, we give a simple numerical scheme to calculate this minimizing problem numerically and discuss convergence of a forward-backward splitting scheme. Several numerical experiments are given.