Affiliation:
1. Department of Applied Mathematics, School of Science, Northwestern Polytechnical University, Xi’an, Shaanxi, P.R. China
Abstract
Let G? be an oriented graph and S(G?) be its skew-adjacency matrix, where G
is called the underlying graph of G?. The skew-rank of G?, denoted by
sr(G?), is the rank of S(G?). Denote by d(G) = |E(G)|-|V(G)| + ?(G) the
dimension of cycle spaces of G, where |E(G)|, |V(G)| and ?(G) are the edge
number, vertex number and the number of connected components of G,
respectively. Recently, Wong, Ma and Tian [European J. Combin. 54 (2016)
76-86] proved that sr(G?) ? r(G) + 2d(G) for an oriented graph G?, where
r(G) is the rank of the adjacency matrix of G, and characterized the graphs
whose skew-rank attain the upper bound. However, the problem of the lower
bound of sr(G?) of an oriented graph G? in terms of r(G) and d(G) of its
underlying graph G is left open till now. In this paper, we prove that
sr(G?) ? r(G)-2d(G) for an oriented graph G? and characterize the graphs
whose skew-rank attain the lower bound.
Publisher
National Library of Serbia
Cited by
5 articles.
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