Ryan Martin, Brendon Stanton
Published 2010-04-19Version 1
An $r$-identifying code on a graph $G$ is a set $C\subset V(G)$ such that for every vertex in $V(G)$, the intersection of the radius-$r$ closed neighborhood with $C$ is nonempty and unique. On a finite graph, the density of a code is $|C|/|V(G)|$, which naturally extends to a definition of density in certain infinite graphs which are locally finite. We present new lower bounds for densities of codes for some small values of $r$ in both the square and hexagonal grids.
Improved Bounds for $r$-Identifying Codes of the Hex Grid
Distinguishing homomorphisms of infinite graphs
Lower bounds on maximal determinants of +-1 matrices via the probabilistic method
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