Cantor uniqueness along subsequences

Speaker
Gady Kozma, Weizmann Institute
Date
31/03/2019 - 13:00 - 12:00Add to Calendar 2019-03-31 12:00:00 2019-03-31 13:00:00 Cantor uniqueness along subsequences In 1870 Cantor proved that a trigonometric series which converges to zero everywhere must be trivial. In the 50s it was asked: under what conditions is this still true if the convergence is only along a subsequence? We will show a number of results on this topic, hopefully some hints of the proofs will also be showed. Joint work with A. Olevskii. Department Seminar Room 216/201 אוניברסיטת בר-אילן - Department of Mathematics mathoffice@math.biu.ac.il Asia/Jerusalem public
Place
Department Seminar Room 216/201
Abstract

In 1870 Cantor proved that a trigonometric series which converges to zero everywhere must be trivial. In the 50s it was asked: under what conditions is this still true if the convergence is only along a subsequence? We will show a number of results on this topic, hopefully some hints of the proofs will also be showed. Joint work with A. Olevskii.

Last Updated Date : 24/03/2019