Hot spots in convex domains are in the tips (up to an inradius)
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Publication:3296354
DOI10.1080/03605302.2020.1750427zbMath1444.35034arXiv1907.13044OpenAlexW3016277639MaRDI QIDQ3296354
Publication date: 7 July 2020
Published in: Communications in Partial Differential Equations (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1907.13044
Brownian motion (60J65) Laplace operator, Helmholtz equation (reduced wave equation), Poisson equation (35J05)
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Cites Work
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- Gaussian heat kernel bounds through elliptic Moser iteration
- Sharp \(L^1\)-Poincaré inequalities correspond to optimal hypersurface cuts
- An optimal Poincaré inequality for convex domains
- The hot spots problem in planar domains with on hole
- Rearrangements and convexity of level sets in PDE
- On the nodal line of the second eigenfunction of the Laplacian in \(\mathbb{R}^ 2\)
- A counterexample to the ``hot spots conjecture
- On the ``hot spots conjecture of J. Rauch
- Location of hot spots in thin curved strips
- Fiber Brownian motion and the ``hot spots problem
- On nodal lines of Neumann eigenfunctions
- Analysis on local Dirichlet spaces. II: Upper Gaussian estimates for the fundamental solutions of parabolic equations
- Asymptotics of the first nodal line of a convex domain
- A planar convex domain with many isolated ``hot spots on the boundary
- Euclidean triangles have no hot spots
- Scaling coupling of reflecting Brownian motions and the hot spots problem
- The “hot spots” conjecture for a certain class of planar convex domains
- The size of the first eigenfunction of a convex planar domain
- On Neumann eigenfunctions in lip domains
- The “hot spots” conjecture for domains with two axes of symmetry
- Closed Nodal Lines and Interior Hot Spots of the Second Eigenfunctions of the Laplacian on Surfaces
- On the Location of Maxima of Solutions of Schrödinger's Equation
- Uniform Level Set Estimates for Ground State Eigenfunctions
- An inequality for potentials and the 'hot-spots' conjecture
- Locating the first nodal linein the Neumann problem
- A dimension-free Hermite–Hadamard inequality via gradient estimates for the torsion function
- Stochastic Processes
- Critical points of solutions of degenerate elliptic equations in the plane
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