Bartnik Mass of CMC surfaces under a Spectral non-negativity condition
Abstract
Let g be a smooth Riemannian metric and H a positive function on S2. We prove that the Bartnik mass of the triple (S2,g,H) is bounded above by |S2|g/16π provided the first eigenvalue of the operator (-Δg+Kg) is non-negative. This eigenvalue condition, in particular, imposes no lower bound on Kg (even under an area constraint) and thereby extends previous results which assume Kg≥ 0.
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