A generalization of Rado's Theorem for almost graphical boundaries |
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| Authors: | Brian?Dean,Giuseppe?Tinaglia mailto:tinaglia@math.jhu.edu" title=" tinaglia@math.jhu.edu" itemprop=" email" data-track=" click" data-track-action=" Email author" data-track-label=" " >Email author |
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| Affiliation: | (1) Department of Mathematics, Hylan Building, University of Rochester, Rochester, NY 14627, USA;(2) Department of Mathematics, Johns Hopkins University, 3400 N. Charles St., Baltimore, MD 21218, USA |
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| Abstract: | ![]()
In this paper, we prove a generalization of Rado's Theorem, a fundamental result of minimal surface theory, which says that minimal surfaces over a convex domain with graphical boundaries must be disks which are themselves graphical. We will show that, for a minimal surface of any genus, whose boundary is ``almost graphical' in some sense, that the surface must be graphical once we move sufficiently far from the boundary. |
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