Discrete Mathematics Seminar
Spring 2025
March 28 | L. Wagstrom, URI | The tree-depth and criticality of unicyclic graphs |
Abstract:
The tree-depth of a graph G is defined as the smallest k for which there exists a proper labeling L of G such that
if L(x) = L(y) then every path between x and y must contain a vertex z with L(z) > L(x). The graph G is k-critical if it has
tree-depth k and every proper minor of G has tree-depth at most k-1.
We investigate when unicyclic graphs are critical. Despite unicyclic graphs' relatively simple structure it is surprisingly
difficult to classify when they are critical. Part of this difficulty arises from the large variance of structures in unicyclic graphs.
We present several families of critical unicyclic graphs that vary greatly in structure. However, despite the difficulty we will
go over a potential classification of critical unicyclic graphs. In addition to these results, we present patterns present
in the optimal feasible tree-depth labelings of cycles and general graphs.
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February 12 | F. Bailey, URI | Choice Numbers of Graphs: a Probabilistic Approach |
Abstract:
In this seminar we explore key results from the paper Choice Numbers of Graphs:
a Probabilistic Approach by Noga Alon.
In particular, we will prove there exists a constant $c$, such that the
choice number of $K_{m\star r}$ has an upper bound of
$s_0=cr\log(m)$. We start with Case 1 where the number of partitions is less than
or equal to the number of vertices in each partition,
$r\leq m$. Then we will consider Case 2: where the number of partitions is greater than
the number of vertices in each partition, $r>m$.
This approach gives insights into the probabilistic methods used in the proof and demonstrates
how ideas of graph colorings have developed.
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Fall 2024
November 1 | D. Cranston, Virginia Commonwealth University | Proper Conflict-free Coloring of Graphs with Large Maximum Degree |
Abstract:
A proper coloring of a graph is \emph{conflict-free} if, for every non-isolated vertex, some color
is used exactly once on its neighborhood. Caro, Petru\v{s}evski, and \v{S}krekovski proved that every
graph $G$ has a proper conflict-free coloring with at most $5\Delta(G)/2$ colors and conjectured that
$\Delta(G)+1$ colors suffice for every connected graph $G$ with $\Delta(G)\ge 3$. Our first main result
is that even for list-coloring, $\left\lceil1.6550826\Delta(G)+\sqrt{\Delta(G)}\right\rceil$ colors suffice for
every graph $G$ with $\Delta(G)\ge 10^{8}$; we also prove slightly weaker bounds for all graphs with
$\Delta(G)\ge 750$. These results follow from our more general framework on proper conflict-free
list-coloring of a pair consisting of a graph $G$ and a ``conflict'' hypergraph $H$. Our proof uses a fairly
new type of recursive counting argument called Rosenfeld counting, which is a variant of the Lov\'{a}sz Local
Lemma or entropy compression. This is joint work with Chun-Hung Liu.
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