Compact minimal vertical graphs with non-connected boundary in Hn×R
Abstract
We study the existence and uniqueness problem of compact minimal vertical graphs in Hn×R, n≥ 2, over bounded domains in the slice Hn×\0\, with non-connected boundary having a finite number of C0 hypersufaces homeomorphic to the sphere Sn-1, with prescribed bounded continuous boundary data, under hypotheses relating those data and the geometry of the boundary. We show the nonexistence of compact minimal vertical graphs in Hn×R having the boundary in two slices and the height greater than or equal to π/(2n-2).
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