The row left rank of quaternion unit gain graphs in terms of pendant vertices
Abstract
Let G=(G,U(Q),) be a quaternion unit gain graph (or U(Q)-gain graph), where G is the underlying graph of G, U(Q)=\q∈ Q: |q|=1\ and :E→ U(Q) is the gain function such that (eij)=(eji)-1=(eji) for any adjacent vertices vi and vj. Let A(G) be the adjacency matrix of G and let r(G) be the row left rank of G. In this paper, we prove some lower bounds on the row left rank of U(Q)-gain graphs in terms of pendant vertices. All corresponding extremal graphs are characterized.
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