Abstract
We show that an Osserman-type inequality holds for spacelike surfaces of constant mean curvature 1 with singularities and with ends in de Sitter 3-space. An immersed of a constant mean curvature 1 surface is an elliptic end if the monodromy representation at the is diagonalizable with eigenvalues in the unit circle. We also give a necessary and sufficient condition for equality in the inequality to hold, and in the process of doing this we derive a condition for determining when ends are embedded.
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