Binary linear codes are constructed from graphs, in particular, by the generator matrix \([I_n | A]\) where \(A\) is the adjacency matrix of a graph on \(n\) vertices. A combinatorial interpretation of the minimum distance of such codes is given. We also present graph theoretic conditions for such linear codes to be Type I and Type II self-dual. Several examples of binary linear codes produced by well-known graph classes are given.

self-dual codes, isodual codes, graphs, adjacency matrix, strongly regular graphs