Density of the domain of doubly nonlinear operators in L1

Abstract

The aim of this paper is to provide sufficient conditions implying that the effective domain D(Aφ) of an m-accretive operator Aφ in L1 is dense in L1. Here, Aφ refers to the composition A φ in L1 of the part A=(∂E) L1 ∞ in L1∞× L1∞ of the subgradient ∂E in L2 of a convex, proper, lower semicontinuous functional E on L2 and a continuous, strictly increasing function φ on the real line R. To illustrate the role of the sufficient conditions, we apply our main result to the class of doubly nonlinear operators Aφ, where A is a classical Leray-Lions operator.