An inhomogeneous singular perturbation problem for the p(x)-Laplacian

Abstract

In this paper we study the following singular perturbation problem for the p(x)-Laplacian: \[ p(x)u:=div(|∇ u(x)|p(x)-2∇ u)=β(u)+f, u≥ 0, \] where >0, β(s)=1 β(s ), with β a Lipschitz function satisfying β>0 in (0,1), β 0 outside (0,1) and ∫ β(s)\, ds=M. The functions u, f and p are uniformly bounded. We prove uniform Lipschitz regularity, we pass to the limit ( 0) and we show that, under suitable assumptions, limit functions are weak solutions to the free boundary problem: u0 and \[ cases p(x)u= f & in \u>0\\\ u=0,\ |∇ u| = λ*(x) & on ∂\u>0\ cases \] with λ*(x)=(p(x)p(x)-1\,M)1/p(x), p= p and f= f. In LW4 we prove that the free boundary of a weak solution is a C1,α surface near flat free boundary points. This result applies, in particular, to the limit functions studied in this paper.