Tangential contact of free boundaries and the fixed boundary for variational solutions to a free transmission Problem

Abstract

In this article we study functionals of the following type ∫ ( A(x,u)∇ u, ∇ u + (x,u) )\,dx here A(x,u)= A+(x)\u>0\+A-(x) \u≤ 0\ for some elliptic and bounded matrices A with H\"older continuous entries and (x,u) = λ+(x) \u>0\ + λ-(x) \u 0\. We prove that the free boundaries of minimizers of the above functional touches the fixed boundary ∂ in a tangential fashion, provide the graph of boundary data touches its zeros smoothly. This assumption is reflected in the DPT condition.