Jeffrey J. Langford scite author profile

Jeffrey J. Langford

5Publications

68Citation Statements Received

100Citation Statements Given

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Affiliations

Bucknell University

Publications

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Improved Bounds for Hermite–Hadamard Inequalities in Higher Dimensions

et al. 2019

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Let Ω ⊂ R n be a convex domain and let f : Ω → R be a positive, subharmonic function (i.e. ∆f ≥ 0). Thenwhere cn ≤ 2n 3/2 . This inequality was previously only known for convex functions with a much larger constant. We also show that the optimal constant satisfies cn ≥ n − 1. As a byproduct, we establish a sharp geometric inequality for two convex domains where one contains the other Ω 2 ⊂ Ω 1 ⊂ R n :

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Comparison Results, Exit Time Moments, and Eigenvalues on Riemannian Manifolds with a Lower Ricci Curvature Bound

2018

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Exit time moments and eigenvalue estimates

Dryden

Langford

McDonald

2017

Bull. London Math. Soc.

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We give upper bounds on the principal Dirichlet eigenvalue associated to a smoothly bounded domain in a complete Riemannian manifold; the bounds involve L1‐norms of exit time moments of Brownian motion. Our results generalize a classical inequality of Pólya. We also prove lower bounds for Dirichlet eigenvalues using invariants that arise during the examination of the relationship between the heat content and exit time moments.

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Sharp Poincaré inequalities in a class of non-convex sets

et al. 2018

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Let γ be a smooth, non-closed, simple curve whose image is symmetric with respect to the y-axis, and let D be a planar domain consisting of the points on one side of γ, within a suitable distance δ of γ. Denote by µ odd 1 (D) the smallest nontrivial Neumann eigenvalue having a corresponding eigenfunction that is odd with respect to the y-axis. If γ satisfies some simple geometric conditions, then µ odd 1 (D) can be sharply estimated from below in terms of the length of γ, its curvature, and δ. Moreover, we give explicit conditions on δ that ensure µ odd 1 (D) = µ 1 (D). Finally, we can extend our bound on µ odd 1 (D) to a certain class of three-dimensional domains. In both the two-and three-dimensional settings, our domains are generically non-convex.2010 Mathematics Subject Classification. 35J25,35P15.

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Subharmonicity, comparison results, and temperature gaps in cylindrical domains

Langford¹

2016

Differential Integral Equations

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