# Logan Crew

Department of Combinatorics & Optimization

University of Waterloo

200 University Avenue West

Waterloo, ON, N2L 3G1

Canada

Email: lcrew@uwaterloo.ca

I am a Research Assistant Professor at the University of Waterloo. My research is in algebraic combinatorics with a focus on the theory of symmetric functions, particularly the chromatic symmetric function. I earned my PhD from the University of Pennsylvania in 2020; my advisors were Jim Haglund and Greta Panova.

My papers are available on **arXiv** and on **Google Scholar.**

**Here** is a list of pairs of small graphs that have equal chromatic symmetric function, and their characteristics. This list was compiled by myself and Sophie Spirkl with a computer program, using the **database of graphs** provided by Brendan McKay on his homepage.

My wife **Sophie Spirkl** is an Assistant Professor in the Department of Combinatorics & Optimization at the University of Waterloo.

Students:

PhD - Josephine Reynes (2021-) [co-supervised with Karen Yeats]

Masters - Evan Haithcock (2021-)

Undergraduate - William Chan (2021)

Papers and preprints:

**Tree Bases of Chromatic Symmetric Functions**

Submitted (2021).

**Published** in *Discrete Mathematics* (2021).

**Plethysms of Chromatic and Tutte Symmetric Functions**with Sophie Spirkl.

Submitted (2021).

**Modular Relations of the Tutte Symmetric Function**with Sophie Spirkl.

**Accepted **by *Journal of Combinatorial Theory, Series A* (2021).

**Branching Rules for Splint Root Systems**with Alexandre A. Kirillov and Yao-Rui Yeo.

**Published** by *Journal of Algebras and Representation Theory *(2021).

**A Vertex-Weighted Tutte Symmetric Function, and Constructing Graphs with Equal Chromatic Symmetric Function**with José Aliste-Prieto, Sophie Spirkl, and José Zamora.

**Published** by *Electronic Journal of Combinatorics* (2021).

**A Complete Multipartite Basis for the Chromatic Symmetric Function**with Sophie Spirkl.

**Published** by *SIAM Journal on Discrete Mathematics (SIDMA)* (2021).

**Disproportionate Division**with Bhargav Narayanan and Sophie Spirkl.

**Published** by *Bulletin of the London Mathematical Society *(2020).

**A Deletion-Contraction Relation for the Chromatic Symmetric Function**with Sophie Spirkl.

**Published** by *European Journal of Combinatorics* (2020).

Talks:

**Structural Properties of the Chromatic and Tutte Symmetric Functions**(Slides Only). University of British Columbia Discrete Math Seminar (2021).

**Identities of the Chromatic and Tutte Symmetric Functions**(Slides Only). Canadian Discrete and Algorithmic Mathematics Conference (CanaDAM, 2021).

**The Tutte Symmetric Function**(Slides Only). University of Waterloo Tutte Colloquium (2020).

Edge Deletion-Contraction in the Chromatic and Tutte Symmetric Functions. York University Applied Algebra Seminar (2020). (

**Slides for****4-6**)

Edge Deletion-Contraction in the Chromatic and Tutte Symmetric Functions. University of Waterloo Algebraic Combinatorics Seminar (2020).

Edge Deletion-Contraction in the Chromatic and Tutte Symmetric Functions. University of Florida Combinatorics Seminar (2020).

**A Deletion-Contraction Relation for the Chromatic Symmetric Function**(and**Slides**). University of Albany Virtual Discrete Math 2-Day (2020).

**A Deletion-Contraction Relation for the Chromatic Symmetric Function**(Slides Only). Canadian Discrete and Algorithmic Mathematics Conference (CanaDAM, 2019).

Teaching:

Spring 2021: CO480 (History of Mathematics)

Winter 2021: MATH228 (Differential Equations for Physics and Chemistry)

Fall 2020: MATH115 (Linear Algebra for Engineering)

Reviewer for:

Mathematical Reviews, Journal of Graph Theory, Advances in Applied Mathematics, and Annals of Combinatorics.

PhD thesis:

**Vertex-Weighted Generalizations of Chromatic Symmetric Functions.** Advisors: Jim Haglund and Greta Panova (University of Pennsylvania, 2020).

Master's thesis:

**The Shuffle Conjecture.** Advisor: Jim Haglund (University of Pennsylvania, 2017).

Bachelor's thesis:

**On the characterization of the numbers n such that any group of order n has a given property P.** Advisor: Thomas Haines (University of Maryland, College Park, 2015).