Add to ORKGWe study stability of the spectral gap and observable diameter for metricmeasure spaces satisfying the RCD(1, ∞) condition. We show that if such a space has an almost maximal spectral gap, then it almost contains a Gaussian component, and the Laplacian has eigenvalues that are close to any integers, with dimension-free quantitative bounds. Under the additional assumption that the space admits a needle disintegration, we show that the spectral gap is almost maximal iff the observable diameter is almost maximal, again with quantitative dimension-free bounds
AbstractLet E be a Polish space equipped with a probability measure μ on its Borel σ-field B, and π ...
AbstractWe introduce a certain kind of strong ergodicity condition to study the existence of spectra...
21 pages, 3 figuresWe study the spectrum of the Finsler--Laplace operator for regular Hilbert geomet...
We study stability of the spectral gap and observable diameter for metricmeasure spaces satisfying t...
We study stability of the sharp spectral gap bounds for metric-measure spaces satisfying a curvature...
We consider a "convolution mm-Laplacian" operator on metric-measure spaces and study its spectral pr...
AbstractWe generalise for a general symmetric elliptic operator the different notions of dimension, ...
We show that the joint spectral radius of a set of matrices is strictly increasing as a function of ...
In this note we prove in the nonlinear setting of CD (K, ∞) spaces the stability of the Krasnoselski...
The Urysohn d-width of a metric space quantifies how closely it can be approximated by a d-dimension...
In this work we review two classical isoperimetric inequalities involving eigenvalues of the Laplaci...
The goal of the paper is to sharpen and generalise bounds involving Cheeger’s isoperimetric constant...
In this note we prove in the nonlinear setting of CD (K, 1e) spaces the stability of the Krasnosels...
We propose a new approach to the spectral theory of perturbed linear operators , in the case of a si...
AbstractLet E be a Polish space equipped with a probability measure μ on its Borel σ-field B, and π ...
AbstractWe introduce a certain kind of strong ergodicity condition to study the existence of spectra...
21 pages, 3 figuresWe study the spectrum of the Finsler--Laplace operator for regular Hilbert geomet...
We study stability of the spectral gap and observable diameter for metricmeasure spaces satisfying t...
We study stability of the sharp spectral gap bounds for metric-measure spaces satisfying a curvature...
We consider a "convolution mm-Laplacian" operator on metric-measure spaces and study its spectral pr...
AbstractWe generalise for a general symmetric elliptic operator the different notions of dimension, ...
We show that the joint spectral radius of a set of matrices is strictly increasing as a function of ...
In this note we prove in the nonlinear setting of CD (K, ∞) spaces the stability of the Krasnoselski...
The Urysohn d-width of a metric space quantifies how closely it can be approximated by a d-dimension...
In this work we review two classical isoperimetric inequalities involving eigenvalues of the Laplaci...
The goal of the paper is to sharpen and generalise bounds involving Cheeger’s isoperimetric constant...
In this note we prove in the nonlinear setting of CD (K, 1e) spaces the stability of the Krasnosels...
We propose a new approach to the spectral theory of perturbed linear operators , in the case of a si...
AbstractLet E be a Polish space equipped with a probability measure μ on its Borel σ-field B, and π ...
AbstractWe introduce a certain kind of strong ergodicity condition to study the existence of spectra...
21 pages, 3 figuresWe study the spectrum of the Finsler--Laplace operator for regular Hilbert geomet...