Add to ORKGWe study spectral theory for bounded Borel subsets of R and in particular finite unions of intervals. For Hilbert space, we take L2 of the union of the intervals. This yields a boundary value problem arising from the minimal operator D=12πiddx with domain consisting of C∞ functions vanishing at the endpoints. We offer a detailed interplay between geometric configurations of unions of intervals and a spectral theory for the corresponding self-adjoint extensions of D and for the associated unitary groups of local translations. While motivated by scattering theory and quantum graphs, our present focus is on the Fuglede-spectral pair problem. Stated more generally, this problem asks for a determination of those bounded Borel sets Ω in Rk such t...
AbstractAspectral setis a subsetΩofRnwith Lebesgue measure 0<μ(Ω)<∞ such that there exists a setΛof ...
We investigate tiling properties of spectra of measures, i.e., sets Λ in R such that {e 2πiλx : λ ∈ ...
We study the spectral analysis of one-dimensional operators, motivated by a desire to understand thr...
We study spectral theory for bounded Borel subsets of R and in particular finite unions of intervals...
AbstractLet (Ω, Λ) be a pair of subsets in Rn such that Ω has finite, positive Lebesgue measure. The...
We are concerned with an harmonic analysis in Hilbert spaces L2 (μ), where μ is a probability measur...
We are concerned with an harmonic analysis in Hilbert spaces L2 (μ), where μ is a probability measur...
AbstractLet (Ω, Λ) be a pair of subsets in Rn such that Ω has finite, positive Lebesgue measure. The...
AbstractLet Ω denote a connected and open subset of Rn. The existence of n commuting self-adjoint op...
AbstractA theory of harmonic analysis on a metric group (G, d) is developed with the model of UU, th...
We are concerned with an harmonic analysis in Hilbert spaces L-2(mu), where mu is a probability meas...
The book presents an introduction to the geometry of Hilbert spaces and operator theory, targeting g...
A spectral set is a subset 0 of R n with Lebesgue measure 0<+(0)< such that there exists a set...
Abstract. Given Hilbert space operators A and B, the possible spectra of operators of the form A-BF ...
AbstractThe goal of harmonic analysis on a (noncommutative) group is to decompose the most “natural”...
AbstractAspectral setis a subsetΩofRnwith Lebesgue measure 0<μ(Ω)<∞ such that there exists a setΛof ...
We investigate tiling properties of spectra of measures, i.e., sets Λ in R such that {e 2πiλx : λ ∈ ...
We study the spectral analysis of one-dimensional operators, motivated by a desire to understand thr...
We study spectral theory for bounded Borel subsets of R and in particular finite unions of intervals...
AbstractLet (Ω, Λ) be a pair of subsets in Rn such that Ω has finite, positive Lebesgue measure. The...
We are concerned with an harmonic analysis in Hilbert spaces L2 (μ), where μ is a probability measur...
We are concerned with an harmonic analysis in Hilbert spaces L2 (μ), where μ is a probability measur...
AbstractLet (Ω, Λ) be a pair of subsets in Rn such that Ω has finite, positive Lebesgue measure. The...
AbstractLet Ω denote a connected and open subset of Rn. The existence of n commuting self-adjoint op...
AbstractA theory of harmonic analysis on a metric group (G, d) is developed with the model of UU, th...
We are concerned with an harmonic analysis in Hilbert spaces L-2(mu), where mu is a probability meas...
The book presents an introduction to the geometry of Hilbert spaces and operator theory, targeting g...
A spectral set is a subset 0 of R n with Lebesgue measure 0<+(0)< such that there exists a set...
Abstract. Given Hilbert space operators A and B, the possible spectra of operators of the form A-BF ...
AbstractThe goal of harmonic analysis on a (noncommutative) group is to decompose the most “natural”...
AbstractAspectral setis a subsetΩofRnwith Lebesgue measure 0<μ(Ω)<∞ such that there exists a setΛof ...
We investigate tiling properties of spectra of measures, i.e., sets Λ in R such that {e 2πiλx : λ ∈ ...
We study the spectral analysis of one-dimensional operators, motivated by a desire to understand thr...