Regularity at infinity of Hadamard manifolds with respect to some elliptic operators and applications to asymptotic Dirichlet problems

Abstract

Let M be Hadamard manifold with sectional curvature KM≤-k2, k>0. Denote by ∂∞M the asymptotic boundary of M. We say that M satisfies the strict convexity condition (SC condition) if, given x∈∂∞M and a relatively open subset W⊂∂∞M containing x, there exists a C2 open subset ⊂ M such that x∈*Int(∂∞) ⊂ W and M is convex. We prove that the SC condition implies that M is regular at infinity relative to the operator Q[u] :=div(a(|∇ u|)|∇ u|∇ u), subject to some conditions. It follows that under the SC condition, the Dirichlet problem for the minimal hypersurface and the p-Laplacian (p>1) equations are solvable for any prescribed continuous asymptotic boundary data. It is also proved that if M is rotationally symmetric or if ∈fBR+1KM≥-e2kR/R2+2ε, R≥ R, for some R and ε>0, where BR+1 is the geodesic ball with radius R+1 centered at a fixed point of M, then M satisfies the SC condition.