Last Seminars
Frobenius Algebras, Gendo-Symmetric Algebras, Comultiplications and Dominant Dimension Çiğdem Yırtıcı, University of Stuttgart.Date: 4th of December, 2019, Wednesday, Time: 14.45 – 16.15.Place: Dokuz Eylül Univ., Tınaztepe Campus, Faculty of Science, Department of Mathematics, Classroom B256.Abstract: Two large classes of algebras, Frobenius algebras and gendo-symmetric algebras, are characterized by comultiplication with some special properties. But, there are differences between them. The aim of this ... Read more Frobenius Algebras, Gendo-Symmetric Algebras, Comultiplications and Dominant Dimension |
Prime Ideal Theorem Hikmet Burak Özcan 06/12/2019, Time: 13:30 Place: B256 Abstract: In this talk, firstly we will introduce the notion of number fields and we will mention the ring of integers for a given number field. Then, we will talk about the Prime Ideal Theorem, which is the number field generalization of the prime number theorem. It ... Read more Prime Ideal Theorem |
On the Strong Degree M. Pınar Eroğlu, Dokuz Eylül University.Date: 27th of November, 2019, Wednesday, Time: 14.45 – 16.15.Place: Dokuz Eylül Univ., Tınaztepe Campus, Faculty of Science, Department of Mathematics, Classroom B256.Abstract: In this seminar, we will continue to talk about the strong degree of unital rings. |
Multiple Zeta Values Burak Turfan (DEU)Place: B256Date: 29/11/2019, Time: 13:30 Abstract: In this talk, I will introduce the Riemann zeta function and multiple zeta values. Then, I will show some identities between the Riemann zeta function and harmonic sums. Also, we prove Euler’s formula. I will find some linear relations between the Riemann zeta function and multiple zeta values. |
Variants of the Szemeredi Theorem – 2 Selçuk Demir (DEU) Place: B256 Date and Time: 15/11/2019, 13:15 Abstract: We sill start talking about geometric versions of the Szemeredi theorem.In particular, we plan to discuss the version of the Katznelson-Weiss theorem due to Bourgain. The Katznelson-Weiss theorem says that if A is a subset of the plane with positive upper density, then for ... Read more Variants of the Szemeredi Theorem – 2 |