Joint work with Danny Dyer and Jared Howell.

Ths is joint work with Daniel Hawtin (University of Rijeka, Croatia).

(This is joint work with Lucas Mol)

This is joint work with A. Burgess, R. Cameron, P. Danziger, S. Finbow, C. Jones, and D. Pike.

An involution $\sigma$ of a graph $G$ is strictly matched if its fixed point set induces a clique and any non-fixed point $v\in V(G)$ is connected with its image $\sigma(v)$ by an edge.

In this talk, we introduce the game and our main result that the second player has a strategy to force a draw in this game for graphs that admit a strictly matched involution.

This is joint work with Stephan Dominique Andres, Fionn Mc Inerney, and Richard J. Nowakowski.

Any reconfiguration problem can be modelled with a reconfiguration graph, where the vertices represent feasible solutions and two vertices are adjacent if and only if the corresponding feasible solutions can be transformed to each other via one allowable move.

Our interest is in reconfiguring dominating sets of graphs. The domination reconfiguration graph of a graph $G$, denoted $\mathcal{D}(G)$, has a vertex corresponding to each dominating set of $G$ and two vertices of $\mathcal{D}(G)$ are adjacent if and only if the corresponding dominating sets differ by the deletion or addition of a single vertex. We are interested in properties of domination reconfiguration graphs. For example, it is easy to see that they are always connected and bipartite. While none has a Hamilton cycle, we explore families of graphs whose reconfiguration graphs have Hamilton paths.

This is joint work with: K. Adaricheva, Hofstra University, C. Bozeman, Mount Holyoke College, N. Clarke, Acadia University, R. Haas, University of Hawaii at Manoa, K. Seyffarth, University of Calgary, and H. Smith, Davidson College

Imagine that there is a cost associated with each landmark vertex. Then one would be interested in finding a resolving set of minimum cardinality in $G$; this is the well-studied \emph{metric dimension} of $G$. Imagine further that we can add edges to $G$ in a highly cost effective manner. Then one would be interested in finding a resolving set of minimum cardinality across all graphs $H$ obtained by adding edges to $G$; we introduce this parameter as the \emph{threshold dimension} of $G$.

We give a more geometrical description of those graphs with threshold dimension $b$, characterizing them as graphs that have certain constrained embeddings in the strong product of $b$ paths. We provide a sharp bound on the threshold dimension of $G$ in terms of the chromatic number. We also study \emph{irreducible graphs} -- those for which the threshold dimension is equal to the metric dimension. This is joint work with Matthew Murphy and Ortrud Oellermann.