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Let ( M n , g ) be a complete simply connected n -dimensional Riemannian manifold with curvature bounds Sect g ≤ κ for κ ≤ 0 and Ric g ≥ ( n − 1) Kg for K ≤ 0. We prove that for any bounded domain Ω ⊂ M n with diameter d and Lipschitz boundary, if Ω* is a geodesic ball in the simply connected space form with constant sectional curvature κ enclosing the same volume as Ω, then σ 1 (Ω) ≤ C σ 1 (Ω*), where σ 1 (Ω) and σ 1 (Ω*) denote the first nonzero Steklov eigenvalues of Ω and Ω* respectively, and C = C ( n , κ, K , d ) is an explicit constant. When κ = K , we have C = 1 and recover the Brock–Weinstock inequality, asserting that geodesic balls uniquely maximize the first nonzero Steklov eigenvalue among domains of the same volume, in Euclidean space and the hyperbolic space.
Li et al. (Mon,) studied this question.
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