Subgraph complementation and minimum rank

Abstract

Any finite simple graph G = (V,E) can be represented by a collection C of subsets of V such that uv∈ E if and only if u and v appear together in an odd number of sets in C. Let c2(G) denote the minimum cardinality of such a collection. This invariant is equivalent to the minimum dimension of a faithful orthogonal representation of G over F2 and is closely connected to the minimum rank of G. We show that c2(G) = mr(G,F2) when mr(G,F2) is odd, or when G is a forest. Otherwise, mr(G,F2)≤ c2(G)≤ mr(G,F2)+1. Furthermore, we show that the following are equivalent for any graph G with at least one edge: i. c2(G)=mr(G,F2)+1; ii. the adjacency matrix of G is the unique matrix of rank mr(G,F2) which fits G over F2; iii. there is a minimum collection C as described in which every vertex appears an even number of times; and iv. for every component G' of G, c2(G') = mr(G',F2) + 1. We also show that, for these graphs, mr(G,F2) is twice the minimum number of tricliques whose symmetric difference of edge sets is E. Additionally, we provide a set of upper bounds on c2(G) in terms of the order, size, and vertex cover number of G. Finally, we show that the class of graphs with c2(G)≤ k is hereditary and finitely defined. For odd k, the sets of minimal forbidden induced subgraphs are the same as those for the property mr(G,F2)≤ k, and we exhibit this set for c2(G)≤2.

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