BEGIN:VCALENDAR
VERSION:2.0
PRODID:-// - ECPv5.3.1//NONSGML v1.0//EN
CALSCALE:GREGORIAN
METHOD:PUBLISH
X-ORIGINAL-URL:https://aarms.math.ca
X-WR-CALDESC:Events for
BEGIN:VTIMEZONE
TZID:UTC
BEGIN:STANDARD
TZOFFSETFROM:+0000
TZOFFSETTO:+0000
TZNAME:UTC
DTSTART:20230101T000000
END:STANDARD
END:VTIMEZONE
BEGIN:VEVENT
DTSTART;TZID=UTC:20230217T110000
DTEND;TZID=UTC:20230222T120000
DTSTAMP:20230603T090228
CREATED:20230131T103547Z
LAST-MODIFIED:20230131T103547Z
UID:7054-1676631600-1677067200@aarms.math.ca
SUMMARY:Minicourse: Group Graded Azumaya Algebras and Generic Constructions
DESCRIPTION:Taught by Professor Eli Aljadeff\, Technion University\, Israel \nThe main theme of this mini-course is gradings by finite groups on finite-dimensional algebras. Similar to the classical situation of ungraded algebras\, we will be interested in finite-dimensional graded simple algebras and finite-dimensional graded division algebras. An important role is played by a generalization of central simple algebras\, called Azumaya algebras. \nOur main tool will be polynomial identities and\, in particular\, graded polynomial identities. This tool will allow us to construct generic graded Azumaya algebras. \nIn the first lecture of the mini-course\, as a part of the motivation to discuss group graded algebras\, I will recall some classical topics such as division algebras\, Brauer groups\, crossed products and Galois cohomology. Then I will introduce G-graded polynomial identities\, where G is a finite group\, and discuss generic constructions. In particular\, for an arbitrary finite-dimensional G-graded simple algebra A over an algebraically closed field F of characteristic 0\, I will construct a generic G-graded Azumaya algebra from which one can obtain by specialization all forms of A in the sense of Galois descent. \nAs a key application\, I will discuss the following problem. It is not difficult to see that for any finite group G\, finite-dimensional G-graded division algebras are G-graded simple and they remain G-graded simple upon any extension of the field of scalars. \nWe will be interested in the opposite direction. Unlike the situation in the ungraded case\, where the algebras of n × n matrices always admit forms which are division algebras\, this is not generally true in the setting of G-graded algebras. \nSuppose that A is a finite-dimensional G-graded simple algebra over an algebraically closed field F. One of the goals of these lectures is to provide necessary and sufficient conditions on the graded structure of A under which A admits forms that are G-graded division algebras. In particular we show that A must be a G-graded simple algebra for which the corresponding generic G-graded simple algebra is a G-graded division algebra. \nThe lectures will be delivered during three time periods\, as shown below. They will take place at the St. John’s campus of Memorial University and will be broadcast via Webex. All the times are in Newfoundland Time (NST=UTC-3:30). \nFriday\, February 17\, 11-12 am\, room A-1045/1046 \nMonday\, February 20\, 11-12 am\, room A-1045/1046 \nWednesday\, February 22\, 11-12 am\, room A-1045/1046 \nThe lectures will be available online via Webex. Contact the organizer for details
URL:https://aarms.math.ca/event/minicourse-group-graded-azumaya-algebras-and-generic-constructions/
LOCATION:Memorial University (St. John’s Campus)\, St. John's\, Newfoundland and Labrador\, Canada
CATEGORIES:AARMS schools and minicourses
ORGANIZER;CN="Yuri%20Bahturin":MAILTO:bahturin@mun.ca
END:VEVENT
END:VCALENDAR