Salem conditions in the non-periodic case
Seminar
Speaker
Prof. E. Liflyand, Bar-Ilan University
Date
11/11/2019 - 15:30 - 14:00Add to Calendar
2019-11-11 14:00:00
2019-11-11 15:30:00
Salem conditions in the non-periodic case
In the classical sources, Salem's necessary conditions for a trigonometric series to be the Fourier
series of an integrable function are given in terms of ``some" sums. Realizing that, in fact, they
are given in terms of the discrete Hilbert transforms, we generalize these to the non-periodic case,
for functions from the Wiener algebra. Other relations of the two objects are also discussed.
The obtained necessary condition is used to construct a monotone function with non-integrable cosine
Fourier transform in a much easier way than in the classical book \cite{Ti} by Titchmarsh.
Certain open problems are posed.
2nd floor Colloquium Room, Building 216
אוניברסיטת בר-אילן - Department of Mathematics
mathoffice@math.biu.ac.il
Asia/Jerusalem
public
Place
2nd floor Colloquium Room, Building 216
Abstract
In the classical sources, Salem's necessary conditions for a trigonometric series to be the Fourier
series of an integrable function are given in terms of ``some" sums. Realizing that, in fact, they
are given in terms of the discrete Hilbert transforms, we generalize these to the non-periodic case,
for functions from the Wiener algebra. Other relations of the two objects are also discussed.
The obtained necessary condition is used to construct a monotone function with non-integrable cosine
Fourier transform in a much easier way than in the classical book \cite{Ti} by Titchmarsh.
Certain open problems are posed.
Last Updated Date : 11/11/2019
