The C&O department has 36 faculty members and 60 graduate students. We are intensely research oriented and hold a strong international reputation in each of our six major areas:
- Algebraic combinatorics
- Combinatorial optimization
- Continuous optimization
- Cryptography
- Graph theory
- Quantum computing
Read more about the department's research to learn of our contributions to the world of mathematics!
News
Three C&O faculty win Outstanding Performance Awards
The awards are given each year to faculty members across the University of Waterloo who demonstrate excellence in teaching and research.
Prof. Alfred Menezes is named Fellow of the International Association for Cryptologic Research
The Fellows program, which was established in 2004, is awarded to no more than 0.25% of the IACR’s 3000 members each year and recognizes “outstanding IACR members for technical and professional contributions to cryptologic research.”
C&O student Ava Pun receives Jessie W. H. Zou Memorial Award
She received the award in recognition of her research on simulating virtual training environments for autonomous vehicles, which she conducted at the start-up Waabi.
Events
Graphs and Matroids - Matthew Kroeker
Title: Unavoidable flats in matroids representable over a finite field
Speaker: | Matthew Kroeker |
Affiliation: | University of Waterloo |
Location: | MC 5417 |
Abstract: For a positive integer k and finite field F, we prove that every simple F-representable matroid with sufficiently high rank has a rank-k flat which either is independent, or is a projective or affine geometry over a subfield of F. As a corollary, we obtain the following Ramsey theorem: given an F-representable matroid of sufficiently high rank and any 2-colouring of its points, there is a monochromatic rank-k flat. This is joint work with Jim Geelen and Peter Nelson.
Algebraic and enumerative combinatorics seminar-Joshua Swanson
Title: Cyclotomic generating functions
Speaker: | Joshua Swanson |
Affiliation: | University of Southern California |
Location: | MC 5479 |
Abstract: It is a remarkable fact that for many statistics on finite sets of combinatorial objects, the roots of the corresponding generating function are each either a complex root of unity or zero. These and related polynomials have been studied for many years by a variety of authors from the fields of combinatorics, representation theory, probability, number theory, and commutative algebra. We call such polynomials *cyclotomic generating functions* (CGFs). We will review some of the many known examples and give results to classify the asymptotic behavior of their coefficient sequences in certain regimes.
Joint work with Sara Billey.
There will be a pre-seminar presenting relevant background at the beginning graduate level starting at 1pm.
C&O Reading Group - Rian Neogi Part 2
Speaker: | Rian Neogi |
Affiliation: | University of Waterloo |
Location: | MC 6029 |
Abstract: In this talk, we will cover the paper of Svensson and Tarnawski that shows that perfect matching in general (non-bipartite) graphs in is quasi-NC. Similar to the work of Fenner, Gurjar and Thierauf (covered earlier in the reading group), the approach is to derandomize the isolation lemma for the perfect matching polytope by applying weight functions to iteratively restrict to subfaces of the polytope. However, the perfect matching polytope in general graphs is not as well-structured as it is in bipartite graphs. The faces of the polytope no longer correspond to subgraphs and now involve additional tight odd set constraints that need to be dealt with. This makes it so that a cycle with non-zero circulation may still exist in the support of the new face. Additionally, the existence of odd cycles in the graph breaks the cycle counting argument used in the paper of Fenner, Gurjar, Thierauf. We will see how Svensson and Tarnawski deal with these issues in the talk.