Add to ORKGHow to generalize the concept of eigenvalues of quadratic forms to eigenvalues of arbitrary, even, homogeneous continuous functionals, if stability of the set of eigenvalues under small perturbations is required? We compare two possible generalizations, Gromov’s homotopy significant spectrum and the Krasnoselskii spectrum. We show that in the finite dimensional case, the Krasnoselskii spectrum is contained in the homotopy significant spectrum, but provide a counterexample to the opposite inclusion. Moreover, we propose a small modification of the definition of the homotopy significant spectrum for which we can prove stability. Finally, we show that the Cheeger constant of a closed Riemannian manifold corresponds to the second Krasnoselskii ...
AbstractWe investigate the behavior of eigenvalues under structured perturbations. We show that for ...
We give a practical tool to control the L∞-norm of the Steklov eigenfunctions in a Lipschitz domain ...
Buser’s inequality gives an upper bound on the first non-zero eigenvalue of the Laplacian of a close...
How to generalize the concept of eigenvalues of quadratic forms to eigenvalues of arbitrary, even, h...
The notion of a harmonic spectrum in stable homotopy theory was intro-duced by the second author in ...
AbstractTo a regular hypergraph we attach an operator, called its adjacency matrix, and study the se...
∂y2 in the plane) is one of the most basic operators in all of mathematical analysis. It can be used...
This paper is dedicated to Freydoon Shahidi on the occasion of his sixtieth birthday. Abstract. We r...
Abstract. We investigate the behavior of eigenvalues under structured perturbations. We show that fo...
AbstractThis paper is concerned with continuous and discrete linear skew-product dynamical systems i...
The essential spectrum of the Laplacian on functions over a noncompact Riemannian manifold has been ...
We describe a method for comparing the real analytic eigenbranches of two families of quadratic form...
Resolutions of identity for certain non-Hermitian Hamiltonians constructed from biorthogonal sets of...
In this paper, we investigate the relation between the Q-spectrum and the structure of G in terms of...
The interplay between spectrum and structure of graphs is the recurring theme of the three more or l...
AbstractWe investigate the behavior of eigenvalues under structured perturbations. We show that for ...
We give a practical tool to control the L∞-norm of the Steklov eigenfunctions in a Lipschitz domain ...
Buser’s inequality gives an upper bound on the first non-zero eigenvalue of the Laplacian of a close...
How to generalize the concept of eigenvalues of quadratic forms to eigenvalues of arbitrary, even, h...
The notion of a harmonic spectrum in stable homotopy theory was intro-duced by the second author in ...
AbstractTo a regular hypergraph we attach an operator, called its adjacency matrix, and study the se...
∂y2 in the plane) is one of the most basic operators in all of mathematical analysis. It can be used...
This paper is dedicated to Freydoon Shahidi on the occasion of his sixtieth birthday. Abstract. We r...
Abstract. We investigate the behavior of eigenvalues under structured perturbations. We show that fo...
AbstractThis paper is concerned with continuous and discrete linear skew-product dynamical systems i...
The essential spectrum of the Laplacian on functions over a noncompact Riemannian manifold has been ...
We describe a method for comparing the real analytic eigenbranches of two families of quadratic form...
Resolutions of identity for certain non-Hermitian Hamiltonians constructed from biorthogonal sets of...
In this paper, we investigate the relation between the Q-spectrum and the structure of G in terms of...
The interplay between spectrum and structure of graphs is the recurring theme of the three more or l...
AbstractWe investigate the behavior of eigenvalues under structured perturbations. We show that for ...
We give a practical tool to control the L∞-norm of the Steklov eigenfunctions in a Lipschitz domain ...
Buser’s inequality gives an upper bound on the first non-zero eigenvalue of the Laplacian of a close...