Let $\Gamma$ be a graph with vertex set $V$, and let $n=|V|$. A distance magic labeling of $\Gamma$ is a bijection $\ell : V \mapsto \{1,2, \ldots, n\}$ for which there exists a positive integer $r$ such that $\sum_{y \in \Gamma(x)} \ell(y) = r$ for all vertices $y \in V$, where $\Gamma(x)$ is the neighborhood of $x$. A graph is said to be distance magic if it admits a distance magic labeling. In this talk I will discuss tetravalent distance magic circulants and distance magic Hamming graphs.

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