Contact Info
Pure MathematicsUniversity of Waterloo
200 University Avenue West
Waterloo, Ontario, Canada
N2L 3G1
Departmental office: MC 5304
Phone: 519 888 4567 x43484
Fax: 519 725 0160
Email: puremath@uwaterloo.ca
Thursday, May 29, 2014 — 4:00 PM EDT
Michael Baker, Department of Pure Mathematics, University of Waterloo
“Representations of sl(3;C)”
Thursday, May 29, 2014 — 2:30 PM EDT
Matthew Beckett, Department of Pure Mathematics, University of Waterloo
“Complex submanifolds continued, and zero sets of analytic functions”
Thursday, May 29, 2014 — 1:00 PM EDT
Blake Madill, Department of Pure Mathematics, University of Waterloo
“Semisimple Rings”
Wednesday, May 28, 2014 — 1:00 PM EDT
Talk 1. Mohamed El Alami - 1:00pm
Pure Mathematics Department, University of Waterloo
Tuesday, May 27, 2014 — 4:30 PM EDT
Janis Lazovskis, Department of Pure Mathematics, University of Waterloo
"A gentle introduction to knots and knot invariants"
Tuesday, May 27, 2014 — 1:00 PM EDT
Talk 1. Jon Herman - 1:00pm
Pure Mathematics Department, University of Waterloo
Friday, May 23, 2014 — 10:00 AM EDT
Wenyong An, Pure Mathematics, University of Waterloo
"Families of Thue Inequalities with Transitive Automorphisms"
Abstract: To be announced.
Thursday, May 22, 2014 — 4:30 PM EDT
Matthew Beckett, Department of Pure Mathematics, University of Waterloo
“Bundles and Connections”
Thursday, May 22, 2014 — 4:00 PM EDT
Michael Baker, Department of Pure Mathematics, University of Waterloo
“Representations of sl(2;C) and sl(3;C)”
Thursday, May 22, 2014 — 2:30 PM EDT
Janis Lazovskis, Department of Pure Mathematics, University of Waterloo
“Complex submanifolds”
Thursday, May 22, 2014 — 1:00 PM EDT
Christopher Dugdale, Department of Pure Mathematics, University of Waterloo
“Semisimple Rings”
Wednesday, May 21, 2014 — 1:00 PM EDT
Talk 1. Emilio Verdugo Paredes - 1:00pm
Pure Mathematics Department, University of Waterloo
Thursday, May 15, 2014 — 2:30 PM EDT
Tyrone Ghaswala, Department of Pure Mathematics, University of Waterloo
“The Importance of Being Analytic - A play in several complex variables”
Following Cam’s scintillating introduction, we will prove that every holomorphic function is analytic, and every analytic function is holomorphic. We will then show some extremely nice and desirable properties about differentiating such a function.
Thursday, May 15, 2014 — 1:00 PM EDT
Blake Madill, Department of Pure Mathematics, University of Waterloo
"The Intro to the Intro"
After a quick organizational meeting, we shall investigate the radical of a ring and then some theory on semisimple rings.
Wednesday, May 14, 2014 — 1:00 PM EDT
Talk 1. Ritvik Ramkumar - 1:00pm
Pure Mathematics Department, University of Waterloo
Tuesday, May 13, 2014 — 2:30 PM EDT
Ross Willard, Pure Mathematics, University of Waterloo
"Barto's algorithm for conservative constraints"
In this last in a series of lectures, I will describe Barto's
algorithm for conservative constraints and prove its correctness.
Tuesday, May 13, 2014 — 1:00 PM EDT
Talk 1. Janis Lazovskis - 1:00pm
Pure Mathematics Department, University of Waterloo
Thursday, May 8, 2014 — 3:30 PM EDT
Alexandr Kazda, Vanderbilt University
“What would symmetric Datalog do?”
Thursday, May 8, 2014 — 2:30 PM EDT
Cameron William, Department of Pure Mathematics, University of Waterloo
"A general Cauchy integral formula and power series in several variables."
In this seminar, end goals for the seminar will be discussed, particularly a full generalization of the Cauchy integral formula and Hartog's theorem. An elementary version of the Cauchy integral formula in several variables will be established as well as power series and their properties.
Tuesday, May 6, 2014 — 2:30 PM EDT
Alexander Wires, Department of Pure Mathematics, University of Waterloo
“Dichotomy for Finite Tournaments III”
Tuesday, May 6, 2014 — 1:00 PM EDT
Justin Shaw, Pure Mathematics Department, University of Waterloo
“Invariant Vector Calculus 1”
Thursday, May 1, 2014 — 3:30 PM EDT
Alexander Wires, Department of Pure Math, University of Waterloo
“Dichotomy for Finite Tournaments of Mixed-Type II”
We will continue the proof announced in the first talk: a finite tournament is compatible with a Taylor operation iff it’s polymorphism algebra generates a congruence meet- semidistributive variety.