## Contact Info

Pure MathematicsUniversity of Waterloo

200 University Avenue West

Waterloo, Ontario, Canada

N2L 3G1

Departmental office: MC 5304

Phone: 519 888 4567 x33484

Fax: 519 725 0160

Email: puremath@uwaterloo.ca

Visit our COVID-19 information website to learn how Warriors protect Warriors.

Please note: The University of Waterloo is closed for all events until further notice.

Friday, November 28, 2014 — 3:30 PM EST

Friday, November 28, 2014 — 2:30 PM EST

Friday, November 28, 2014 — 1:00 PM EST

Wednesday, November 26, 2014 — 2:30 PM EST

Tuesday, November 25, 2014 — 1:00 PM EST

Monday, November 24, 2014 — 4:00 PM EST

Friday, November 21, 2014 — 4:00 PM EST

Friday, November 21, 2014 — 2:30 PM EST

Friday, November 21, 2014 — 2:30 PM EST

Friday, November 21, 2014 — 1:00 PM EST

Thursday, November 20, 2014 — 4:30 PM EST

Thursday, November 20, 2014 — 1:30 PM EST

Wednesday, November 19, 2014 — 4:00 PM EST

Wednesday, November 19, 2014 — 1:30 PM EST

Tuesday, November 18, 2014 — 3:30 PM EST

Tuesday, November 18, 2014 — 1:00 PM EST

Monday, November 17, 2014 — 4:00 PM EST

Friday, November 14, 2014 — 3:30 PM EST

Whilst classification results may not, on the surface, appear too

interesting, the classification program for nuclear C*-algebras has

raised numerous thought-provoking questions and led to the development of many useful, structural tools that have applications outside of the

program. In this talk, we shall discuss why this is, and give a number of

Friday, November 14, 2014 — 2:30 PM EST

Friday, November 14, 2014 — 1:30 PM EST

Thursday, November 13, 2014 — 3:30 PM EST

Wednesday, November 12, 2014 — 4:00 PM EST

Wednesday, November 12, 2014 — 1:30 PM EST

For an ideal $I \triangleleft R$, we will define the relative $K$-groups $K_0(R,I)$, $K_1(R,I)$ and talk about the (not long, not short, but just right) exact sequence. This sequence will provide us with a useful tool for computing $K$-groups.

Wednesday, November 12, 2014 — 11:30 AM EST

We will continue and finish the proof that $K^0 (X) \cong K_0 (C(X))$

for $X$ a compact Hausdorff space. We'll see some simple examples, but

computing the $K_0$ (or $K^0$) can be difficult in general. In hope to

aid computation, we'll take a look at the functoriality of $K_0$ and

Tuesday, November 11, 2014 — 4:00 PM EST

Classical Lagrangian interpolation states that one can always prescribe

$n+1$ values of a single variable polynomial of degree $n$. This result

paves the way for many beautiful generalizations in algebraic geometry.

I will discuss a few of these generalizations and their relevance to

University of Waterloo

200 University Avenue West

Waterloo, Ontario, Canada

N2L 3G1

Departmental office: MC 5304

Phone: 519 888 4567 x33484

Fax: 519 725 0160

Email: puremath@uwaterloo.ca

University of Waterloo

University of Waterloo

43.471468

-80.544205

200 University Avenue West

Waterloo,
ON,
Canada
N2L 3G1

The University of Waterloo acknowledges that much of our work takes place on the traditional territory of the Neutral, Anishinaabeg and Haudenosaunee peoples. Our main campus is situated on the Haldimand Tract, the land granted to the Six Nations that includes six miles on each side of the Grand River. Our active work toward reconciliation takes place across our campuses through research, learning, teaching, and community building, and is centralized within our Indigenous Initiatives Office.