A quantitative stability estimate for the fractional Faber-Krahn inequality
From MaRDI portal
Publication:2182583
DOI10.1016/j.jfa.2020.108560zbMath1501.35266arXiv1901.10845OpenAlexW3007339775MaRDI QIDQ2182583
Stefano Vita, Eleonora Cinti, Lorenzo Brasco
Publication date: 26 May 2020
Published in: Journal of Functional Analysis (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1901.10845
Estimates of eigenvalues in context of PDEs (35P15) Variational problems in a geometric measure-theoretic setting (49Q20) Eigenvalue problems for linear operators (47A75) Fractional partial differential equations (35R11)
Related Items (7)
A quantitative stability inequality for fractional capacities ⋮ Stability of the mean value formula for harmonic functions in Lebesgue spaces ⋮ A Hong-Krahn-Szegö inequality for mixed local and nonlocal operators ⋮ An optimal lower bound in fractional spectral geometry for planar sets with topological constraints ⋮ Quantitative inequalities for the expected lifetime of Brownian motion ⋮ The fractional Makai-Hayman inequality ⋮ OPIAL-TYPE INEQUALITY ABOUT CONFORMABLE FRACTIONAL INTEGRALS AND THE APPLICATION
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- The fractional Cheeger problem
- A quantitative isoperimetric inequality for fractional perimeters
- On nonlinear Rayleigh quotients
- An introduction to Sobolev spaces and interpolation spaces
- Stability of variational eigenvalues for the fractional \(p\)-Laplacian
- A mass transportation approach to quantitative isoperimetric inequalities
- Nonlinear ground state representations and sharp Hardy inequalities
- The stability of some eigenvalue estimates
- Weighted Dirichlet-type inequalities for Steiner symmetrization
- Confinement of Brownian motion among Poissonian obstacles in \(\mathbb{R}^d, d\geq 3\)
- Fluctuations of principal eigenvalues and random scales
- Higher Hölder regularity for the fractional \(p\)-Laplacian in the superquadratic case
- On the Bourgain, Brezis, and Mironescu theorem concerning limiting embeddings of fractional Sobolev spaces
- Best constants for Sobolev inequalities for higher order fractional derivatives
- Cases of equality in the Riesz rearrangement inequality
- A selection principle for the sharp quantitative isoperimetric inequality
- \(H^s\) versus \(C^0\)-weighted minimizers
- Faber-Krahn inequalities in sharp quantitative form
- Symmetrization for fractional elliptic and parabolic equations and an isoperimetric application
- The sharp quantitative isoperimetric inequality
- Boundary regularity estimates for nonlocal elliptic equations in \(C^1\) and \(C^{1,\alpha }\) domains
- The Dirichlet problem for the fractional Laplacian: regularity up to the boundary
- Nonlinear equations for fractional Laplacians. I: Regularity, maximum principles, and Hamiltonian estimates
- A Brascamp-Lieb-Luttinger–type inequality and applications to symmetric stable processes
- Stability estimates for certain Faber-Krahn,isocapacitary and Cheeger inequalities
- Symmetric Decreasing Rearrangement Is Sometimes Continuous
- Non-local torsion functions and embeddings
- 7 Spectral inequalities in quantitative form
- An Extension Problem Related to the Fractional Laplacian
- Sobolev Spaces
This page was built for publication: A quantitative stability estimate for the fractional Faber-Krahn inequality
