Add to ORKGWe extend an uncertainty principle due to Beurling into a characterization of Hermite functions. More precisely, all functions f on Rd which may be written as P(x)exp(-(Ax,x)), with A a real symmetric definite positive matrix, are characterized by integrability conditions on the product f(x)f(y). We then obtain similar results for the windowed Fourier transform (also known, up to elementary changes of functions, as the radar ambiguity function or the Wigner transform). We complete the paper with a sharp version of Heisenberg's inequality for this transform
A Beurling-Hormander theorem's is proved for the Fourier transform connected with the Riemann-Liouvi...
ABSTRACT. An uncertainty principle is obtained for a modified Yν-transform of order ν. The principle...
We consider the quantum Liouville equation and give a characterization of the solutions which satisf...
International audienceWe prove various versions of uncertainty principles for a certain Fourier tran...
We study the uncertainty principles of Hardy and of Beurling, and functions that "only just" satisfy...
We prove an uncertainty inequality for the fourier transform on the Heisenberg group analogous to th...
AbstractThe classical uncertainty principle for the Fourier transform has been extended to the spher...
We consider the quantum Liouville equation and give a characterization of the solutions which satisf...
The product, convolution, correlation, Wigner distribution function (WDF) and ambiguity function (AF...
The product, convolution, correlation, Wigner distribution function (WDF) and ambiguity function (AF...
We consider the quantum Liouville equation and give a characterization of the solutions which satisf...
AbstractIn this paper we give new representations for the Fourier transform and we establish the rel...
International audienceUsing the basis of Hermite–Fourier functions (i.e. the quantum oscillator eige...
International audienceUsing the basis of Hermite–Fourier functions (i.e. the quantum oscillator eige...
We propose a refinement of the Robertson–Schrödinger uncertainty principle (RSUP) using Wigner distr...
A Beurling-Hormander theorem's is proved for the Fourier transform connected with the Riemann-Liouvi...
ABSTRACT. An uncertainty principle is obtained for a modified Yν-transform of order ν. The principle...
We consider the quantum Liouville equation and give a characterization of the solutions which satisf...
International audienceWe prove various versions of uncertainty principles for a certain Fourier tran...
We study the uncertainty principles of Hardy and of Beurling, and functions that "only just" satisfy...
We prove an uncertainty inequality for the fourier transform on the Heisenberg group analogous to th...
AbstractThe classical uncertainty principle for the Fourier transform has been extended to the spher...
We consider the quantum Liouville equation and give a characterization of the solutions which satisf...
The product, convolution, correlation, Wigner distribution function (WDF) and ambiguity function (AF...
The product, convolution, correlation, Wigner distribution function (WDF) and ambiguity function (AF...
We consider the quantum Liouville equation and give a characterization of the solutions which satisf...
AbstractIn this paper we give new representations for the Fourier transform and we establish the rel...
International audienceUsing the basis of Hermite–Fourier functions (i.e. the quantum oscillator eige...
International audienceUsing the basis of Hermite–Fourier functions (i.e. the quantum oscillator eige...
We propose a refinement of the Robertson–Schrödinger uncertainty principle (RSUP) using Wigner distr...
A Beurling-Hormander theorem's is proved for the Fourier transform connected with the Riemann-Liouvi...
ABSTRACT. An uncertainty principle is obtained for a modified Yν-transform of order ν. The principle...
We consider the quantum Liouville equation and give a characterization of the solutions which satisf...