Liouville Theorem with Boundary Conditions from Chern--Gauss--Bonnet Formula
Abstract
The σk(Ag) curvature and the boundary Bkg curvature arise naturally from the Chern--Gauss--Bonnet formula for manifolds with boundary. In this paper, we prove a Liouville theorem for the equation σk(Ag)=1 in Rn+ with the boundary condition Bkg=c on ∂Rn+, where g=e2v|dx|2 and c is some nonnegative constant. This extends an earlier result of Wei, which assumes the existence of |x|∞(v(x)+2|x|). In addition, we establish a local gradient estimate for solutions of such equations, assuming an upper bound on the solution v.
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