On the Trace Operator for Functions of Bounded $\mathbb{A}$-Variation
Abstract
In this paper, we consider the space of functions of bounded -variation. For a given first order linear homogeneous differential operator with constant coefficients , this is the space of --functions such that the distributional differential expression is a finite (vectorial) Radon measure. We show that for Lipschitz domains , -functions have an -trace if and only if is -elliptic (or, equivalently, if the kernel of is finite dimensional). The existence of an -trace was previously only known for the special cases that coincides either with the full or the symmetric gradient of the function (and hence covered the special cases or ). As a main novelty, we do not use the fundamental theorem of calculus to construct the trace operator (an approach which is only available in the - and -setting) but rather compare projections onto the nullspace as we approach the boundary. As a sample application, we study the Dirichlet problem for quasiconvex variational functionals with linear growth depending on .
Keywords
Cite
@article{arxiv.1707.06804,
title = {On the Trace Operator for Functions of Bounded $\mathbb{A}$-Variation},
author = {Dominic Breit and Lars Diening and Franz Gmeineder},
journal= {arXiv preprint arXiv:1707.06804},
year = {2020}
}