Pointwise Estimates Near Singular Sets for Quasilinear Elliptic Equations

Abstract

In this work, we study the removability of boundary singular sets for certain classes of quasilinear elliptic equations in domains Ω of an n-dimensional Finsler manifold ( M, F, ). We work with Lipschitz functions ρ1 and ρ2 satisfying distance-type properties; in particular, F(·, ∇ ρ1) ≤ 1 and F(·, ∇ ρ2) ≤ 1 a.e. in M. The singular set is defined by Γ=ρ1-1(\0\). The model problem is -Δp(x) u+|u|q-1 u=0 in domains of Rn Rd × Rn-d ρ1-1(\0\) × ρ2-1(\0\), where ρ1(x)=|(xd+1, …, xn)| and ρ2(x)=|(x1, …, xd)|. The main tool in our analysis is the estimate |u(x)| ≤ C ρ1(x)-τ near Γ for weak solutions u ∈ Wloc1, p(x)(Ω (Γ Σ) ; ) Lloc∞(Ω (Γ Σ)), where the constants C>0 and τ>0 converge to positive values as p+ → 1. This estimate is a key ingredient in proving that the singularity at Γ is removable. Moreover, in a bounded domain Ω, using this estimate and assuming that, for every variable exponent satisfying 1<p- ≤ p+< \2, q+1\, there exists a weak solution up ∈ Wloc1, p(x)(Ω; ) Lloc∞(Ω) of -div(|∇ up|Fp-2 ∇ up)+|up|q-1 up=0 in Ω, we prove that, for every U Ω, there exists a subsequence \upm\, with pm+ → 1, that converges to a solution u ∈ B V(U ; ) Lq+1(U ; ) of -Δ1 u+|u|q-1 u=0 in U .