AbstractA probability measure in Rd is called a spectral measure if it has an orthonormal basis consisting of exponentials. In this paper, we study spectral Cantor measures. We establish a large class of such measures, and give a necessary and sufficient condition on the spectrum of a spectral Cantor measure. These results extend the studies by Jorgensen and Pedersen (J. Anal. Math.75 (1998), 185–228) and Strichartz (J. D'Analyse Math.81 (2000), 209–238)
ABSTRACT: We focus here on some very recent results and its studies. Our main contribution is to pro...
In this paper, we study spectral measures whose square integrable spaces admit a family of exponenti...
We explore the spectral theory of the orthogonal polynomials associated to the classical Cantor meas...
A probability measure in ℝd is called a spectral measure if it has an orthonormal basis consisting o...
AbstractA probability measure in Rd is called a spectral measure if it has an orthonormal basis cons...
We analyze all orthonormal bases of exponentials on the Cantor set defined by Jorgensen and Pedersen...
AbstractWe analyze all orthonormal bases of exponentials on the Cantor set defined by Jorgensen and ...
We analyze all orthonormal bases of exponentials on the Cantor set defined by Jorgensen and Pedersen...
We investigate some relations between number theory and spectral measures related to the harmonic an...
We investigate some relations between number theory and spectral measures related to the harmonic an...
AbstractA Borel measure μ in Rd is called a spectral measure if there exists a set Λ⊂Rd such that th...
In this paper, we consider spectral properties of Riesz product measures supported on homogeneous Ca...
The theory of spectral symbols links sequences of matrices with measurable functions expressing thei...
Abstract. In this paper, we add to the characterization of the Fourier spectra for Bernoulli convolu...
We study spectral measures generated by infinite convolution products of discrete measures generated...
ABSTRACT: We focus here on some very recent results and its studies. Our main contribution is to pro...
In this paper, we study spectral measures whose square integrable spaces admit a family of exponenti...
We explore the spectral theory of the orthogonal polynomials associated to the classical Cantor meas...
A probability measure in ℝd is called a spectral measure if it has an orthonormal basis consisting o...
AbstractA probability measure in Rd is called a spectral measure if it has an orthonormal basis cons...
We analyze all orthonormal bases of exponentials on the Cantor set defined by Jorgensen and Pedersen...
AbstractWe analyze all orthonormal bases of exponentials on the Cantor set defined by Jorgensen and ...
We analyze all orthonormal bases of exponentials on the Cantor set defined by Jorgensen and Pedersen...
We investigate some relations between number theory and spectral measures related to the harmonic an...
We investigate some relations between number theory and spectral measures related to the harmonic an...
AbstractA Borel measure μ in Rd is called a spectral measure if there exists a set Λ⊂Rd such that th...
In this paper, we consider spectral properties of Riesz product measures supported on homogeneous Ca...
The theory of spectral symbols links sequences of matrices with measurable functions expressing thei...
Abstract. In this paper, we add to the characterization of the Fourier spectra for Bernoulli convolu...
We study spectral measures generated by infinite convolution products of discrete measures generated...
ABSTRACT: We focus here on some very recent results and its studies. Our main contribution is to pro...
In this paper, we study spectral measures whose square integrable spaces admit a family of exponenti...
We explore the spectral theory of the orthogonal polynomials associated to the classical Cantor meas...