Benoit Daniel
Published 2003-03-25Version 1
We compute the flux of Killing fields through ends of constant mean curvature 1 in hyperbolic space, and we prove a result conjectured by Rossman, Umehara and Yamada : the flux matrix they have defined is equivalent to the flux of Killing fields. We next give a geometric description of embedded ends of finite total curvature. In particular, we show that we can define an axis for these ends that are asymptotic to a catenoid cousin. We also compute the flux of Killing fields through these ends, and we deduce some geometric properties and some analogies with minimal surfaces in Euclidean space.
Comments: 31 pages, 1 figure, submitted to Illinois Journal of Mathematics
Journal: Illinois J. Math. 47 (3), 2003, 667-698
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