We study spectral measures generated by infinite convolution products of discrete measures generated by Hadamard triples, and we present sufficient conditions for the measures to be spectral, generalizing a criterion by Strichartz. We then study the spectral measures generated by random convolutions of finite atomic measures and rescaling, where the digits are chosen from a finite collection of digit sets. We show that in dimension one, or in higher dimensions under certain conditions, “almost all” such measures generate spectral measures, or, in the case of complete digit sets, translational tiles. Our proofs are based on the study of self-affine spectral measures and tiles generated by Hadamard triples in quasi-product form
We study spectral properties for invariant measures associated to affine iterated function systems. ...
Abstract. In this paper, we add to the characterization of the Fourier spectra for Bernoulli convolu...
We extend the existence of ghost measures beyond nonnegative primitive regular sequences to a large ...
In this paper, we study spectral measures whose square integrable spaces admit a family of exponenti...
We investigate tiling properties of spectra of measures, i.e., sets (Formula presented.) forms an or...
We study the spectrality of a class of self-affine measures with prime determinant. Spectral measure...
The theory of spectral symbols links sequences of matrices with measurable functions expressing thei...
This paper gives a review of the recent progress in the study of Fourier bases and Fourier frames on...
In this paper, we consider spectral properties of Riesz product measures supported on homogeneous Ca...
A probability measure in ℝd is called a spectral measure if it has an orthonormal basis consisting o...
In this paper we study the behaviour at infinity of the Fourier transform ofRadon measures supported...
Motivated by the existence problem of Fourier frames on fractal measures, we introduce Bessel and fr...
Motivated by the existence problem of Fourier frames on fractal measures, we introduce Bessel and fr...
AbstractA probability measure in Rd is called a spectral measure if it has an orthonormal basis cons...
Abstract: Spectral measures arise in numerous applications such as quantum mechanics, signal process...
We study spectral properties for invariant measures associated to affine iterated function systems. ...
Abstract. In this paper, we add to the characterization of the Fourier spectra for Bernoulli convolu...
We extend the existence of ghost measures beyond nonnegative primitive regular sequences to a large ...
In this paper, we study spectral measures whose square integrable spaces admit a family of exponenti...
We investigate tiling properties of spectra of measures, i.e., sets (Formula presented.) forms an or...
We study the spectrality of a class of self-affine measures with prime determinant. Spectral measure...
The theory of spectral symbols links sequences of matrices with measurable functions expressing thei...
This paper gives a review of the recent progress in the study of Fourier bases and Fourier frames on...
In this paper, we consider spectral properties of Riesz product measures supported on homogeneous Ca...
A probability measure in ℝd is called a spectral measure if it has an orthonormal basis consisting o...
In this paper we study the behaviour at infinity of the Fourier transform ofRadon measures supported...
Motivated by the existence problem of Fourier frames on fractal measures, we introduce Bessel and fr...
Motivated by the existence problem of Fourier frames on fractal measures, we introduce Bessel and fr...
AbstractA probability measure in Rd is called a spectral measure if it has an orthonormal basis cons...
Abstract: Spectral measures arise in numerous applications such as quantum mechanics, signal process...
We study spectral properties for invariant measures associated to affine iterated function systems. ...
Abstract. In this paper, we add to the characterization of the Fourier spectra for Bernoulli convolu...
We extend the existence of ghost measures beyond nonnegative primitive regular sequences to a large ...