Variance-Refined In-Diameter Lower Bound for the First Dirichlet Eigenvalue
Abstract
Let (M,g) be a compact n-dimensional Riemannian manifold with nonempty boundary and n≥ 2. Assume that Ric(M) (n-1)K for some K>0 and that ∂ M has nonnegative mean curvature with respect to the outward unit normal. Denote by λ the first Dirichlet eigenvalue of the Laplacian. Ling's gradient-comparison method (Ling, 2006) provides an explicit lower bound for λ in terms of K and the in-diameter d (twice the maximal distance from a point of M to ∂ M). We isolate the only step in Ling's argument that loses quantitative information: a Jensen-H\"older averaging that replaces a nonconstant one-dimensional comparison function by its mean. Using the uniform strong convexity of x x-1/2 on (0,1], we refine this averaging by a variance term and thereby retain part of the discarded oscillation. This yields an explicit closed-form in-diameter bound that is strictly stronger than Ling's estimate for every K>0.
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