Maximizing the index of signed complete graphs with spanning trees on k pendant vertices
Abstract
A signed graph =(G,σ) consists of an underlying graph G=(V,E) with a sign function σ:E→\-1,1\. Let A() be the adjacency matrix of and λ1() denote the largest eigenvalue (index) of .Define (Kn,H-) as a signed complete graph whose negative edges induce a subgraph H. In this paper, we focus on the following problem: which spanning tree T with a given number of pendant vertices makes the λ1(A()) of the unbalanced (Kn,T-) as large as possible? To answer the problem, we characterize the extremal signed graph with maximum λ1(A()) among graphs of type (Kn,T-).
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