Regularity in the two-phase free boundary problems under non-standard growth conditions

Abstract

In this paper, we prove several regularity results for the heterogeneous, two-phase free boundary problems Jγ(u)=∫(f(x,∇ u)+λ+ (u+)γ+λ-(u-)γ+gu)dx→ min under non-standard growth conditions. Included in such problems are heterogeneous jets and cavities of Prandtl-Batchelor type with γ=0, chemical reaction problems with 0<γ<1, and obstacle type problems with γ=1. Our results hold not only in the degenerate case of p> 2 for p-Laplace equations, but also in the singular case of 1<p<2, which are extensions of LdT.