Nordhaus--Gaddum type bounds for the complement rank
Abstract
Let G be an n-vertex simple graph with adjacency matrix AG. The complement rank of G is defined as rank(AG+I), where I is the identity matrix. In this paper we study Nordhaus--Gaddum type bounds for the complement rank. We prove that for every graph G, rank(AG+I)·rank(A G+I) n, rank(AG+I)+rank(A G+I) n+1, with the equality cases characterized. We further obtain strengthened multiplicative lower bounds under additional structural assumptions. Finally, we show that the trivial upper bounds rank(AG+I)·rank(A G+I) n2, rank(AG+I)+rank(A G+I) 2n are tight by explicitly constructing, for every n 4, graphs G with rank(AG+I)=rank(A G+I)=n.
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