Half-space Liouville-type theorems for minimal graphs with capillary boundary
Abstract
In this paper, we prove two Liouville-type theorems for capillary minimal graph over Rn+. First, if u has linear growth, then for n=2,3 and for any θ∈(0,π), or n≥4 and θ∈(π6,5π6), u must be flat. Second, if u is one-sided bounded on Rn+, then for any n and θ∈(0,π), u must be flat. The proofs build upon gradient estimates for the mean curvature equation over Rn+ with capillary boundary condition, which are based on carefully adapting the maximum principle to the capillary setting.
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