About a Proposition on Escobar's paper "The Geometry of the First Non-zero Stekloff Eigenvalue"
Abstract
Let (M2,g0) be a compact manifold with boundary, and let g and g0 be conformally related by g=e2fg0. We show that the inequality 1(g)≥(x∈∂ Me-f(x))1(g0) stated in Proposition 2 in [1], is only possible when the equality is achieved. In order to achieve such equality, it is required that the function f be constant on ∂ M, as it is mentioned in Remark 3 also in [1]. Hence, the scope of this inequality is less broad than the one suggested by the Proposition.
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