Jarosław Swaczyna: Zoo of ideal Schauder bases
24/11/23 12:02
Tuesday, November 28, 2023 17:00
Location: room 601, Mathematical Institute, University of Wroclaw
Speaker: Jarosław Swaczyna (Łódź University of Technology)
Title: Zoo of ideal Schauder bases
Abstract: Given a Banach space \(X\), sequence \((e_n)\) of its elements and an ideal \(I\) on natural numbers we say that \((e_n)\) is an \(I\)-Schauder base if for every \(x \in X\) there exists unique sequence of scalars \(\alpha_n\) such that series of \(\alpha_n e_n\) is \(I\)-convergent to \(X\). In such a case one may also consider coordinate functionals \(e_n^\star\). About ten years ago Kadets asked if those functionals are necessarily continuous at least for some nice ideals, e.g. the ideal of sets of density zero. During my talk I will present an answer to this question obtained jointly with Tomasz Kania and Noe de Rancourt. I will also present some examples of ideal Schauder bases which are not the classical ones. Second part will be based on ongoing work with Adam Kwela.
Location: room 601, Mathematical Institute, University of Wroclaw
Speaker: Jarosław Swaczyna (Łódź University of Technology)
Title: Zoo of ideal Schauder bases
Abstract: Given a Banach space \(X\), sequence \((e_n)\) of its elements and an ideal \(I\) on natural numbers we say that \((e_n)\) is an \(I\)-Schauder base if for every \(x \in X\) there exists unique sequence of scalars \(\alpha_n\) such that series of \(\alpha_n e_n\) is \(I\)-convergent to \(X\). In such a case one may also consider coordinate functionals \(e_n^\star\). About ten years ago Kadets asked if those functionals are necessarily continuous at least for some nice ideals, e.g. the ideal of sets of density zero. During my talk I will present an answer to this question obtained jointly with Tomasz Kania and Noe de Rancourt. I will also present some examples of ideal Schauder bases which are not the classical ones. Second part will be based on ongoing work with Adam Kwela.