±¨¸æÌâÄ¿���£ºA friendly introduction to skew braces and their connections with the Yang-Baxter equation
±¨ ¸æ ÈË�����£ºSin Yi Tsang
ËùÔÚµ¥Î»�����£ºOchanomizu University
±¨¸æʱ¼ä����£ºMarch 6, 2025, 20:00-22:00
±¨¸æµØµã�����£ºZoom Id: 904 645 6677����£¬Password: 2024
»áÒéÁ´½Ó�����£º
https://zoom.us/j/9046456677?pwd=Y2ZoRUhrdWUvR0w0YmVydGY1TVNwQT09&omn=89697485456
±¨¸æÕªÒª: Skew brace is an algebraic structure that arose out of the study of set-theoretic solutions to the Yang-Baxter equation. In this talk, I will start with the definition and basic examples of skew braces, and then I will explain some connections between skew braces and solutions to the Yang-Baxter equation. I will also discuss some research directions in the study of skew braces from the algebraic point of view.
±¨¸æÈ˼ò½é�����£ºSin Yi Tsang have been a faculty member at Ochanomizu University since April 2021. She received her Ph.D. from the University of California, Santa Barbara in 2016. Before coming to Japan, She was a research fellow at Sun Yat-Sen University, Zhuhai (2018~2020), and a postdoctoral fellow at the Yau Mathematical Sciences Center at Tsinghua University (2016~2018). Other than skew braces, She is also interested in Hopf-Galois structures and regular subgroups of the holomorph.
