Group theory qual practice
UNT Graduate Algebra Group
Speakers: Dillon Hanson, Naomi Krawzik, Colin LawsonDate: October 22, 2019
Location: GAB 439A
Abstract: Prove or give an explicit counterexample: If G is a group of order 8p for p an odd prime, then G has a proper non-trivial normal subgroup. Let G be a group of order 108. Show that G has a normal subgroup of order 9 or order 27. Prove there are no simple groups of order 72.
Fall 2019 Schedule
September 3 | Invariants of Landweber-Stong reflection groups modulo Frobenius powers | Chelsea Drescher |
September 17 | Group theory qual practice | Thomas Calkin |
September 24 | Introduction to deformation theory | Naomi Krawzik |
October 8 | Classification of graded Hecke algebras | Naomi Krawzik |
October 15 | Classification of graded Hecke algebras | Naomi Krawzik |
October 22 | Group theory qual practice | Dillon Hanson, Naomi Krawzik, Colin Lawson |
October 29 | Invariant differential forms | Dillon Hanson |
November 5 | An introduction to Hochshild cohomology and deformations | Colin Lawson |
November 26 | Sums of three squares along arithmetic progressions | Ethan Malmer |
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