The Dirichlet-to-Neumann operator associated with the 1-Laplace operator and evolution problems

Abstract

We present first results on the Dirichlet-to-Neumann operator associated with the 1-Laplace operator in L1. In particular, we show that this operator can be realized as a sub-differential operator in L1× L∞ of a homogeneous convex, continuous functional with effective domain L1. Even though the Dirichlet problem associated with the 1-Laplace operator loses the property that weak solutions for boundary data in L1 are unique, we prove a type of stability/compactness result with respect to the boundary data in L1 of this problem. We apply our results for the stationary Dirichlet problem to evolution problems governed by the Dirichlet-to-Neumann operator, which can equivalently be formulated as singular coupled elliptic-parabolic initial boundary-value problems. For initial data in Lq, 1 q ∞, we obtain well-posedness, that every mild solution is, indeed, a strong solution, and establish long-time stability of the semigroup generated by the negative Dirichlet-to-Neumann operator associated with the 1-Laplace operator.