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Rényi Intézet, Nagyterem
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Description
Skew braces were introduced by Guarnieri and Vendramin in 2017, generalizing an earlier concept by Rump. They are related to the study of the Yang–Baxter equation in theoretical physics. A skew brace is an algebra (A;+,◦), where both (A;+) and (A;◦) are groups (despite what the notation suggests, the operation + need not be commutative), and the identity x◦(y+z)=x◦y−x+x◦z is satisfied. While there are lots of papers on skew braces written by group theorists, this new algebraic structure has not arouse the interest but a few universal algebraists. I am going to discuss some open problems concerning skew braces.
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Zoom:
https://us06web.zoom.us/j/82153686539?pwd=Ae2aM9e0OIl4mDTNf68zsqp6Kn63UV.1
Meeting ID: 821 5368 6539
Passcode: 098489