Line graphs with the largest eigenvalue multiplicity
Abstract
For a connected graph G, we denote by L(G), mG(λ), c(G) and p(G) the line graph of G, the eigenvalue multiplicity of λ in G, the cyclomatic number and the number of pendant vertices in G, respectively. In 2023, Yang et al. WL LT proved that mL(T)(λ)≤ p(T)-1 for any tree T with p(T)≥ 3, and characterized all trees T with mL(T)(λ) = p(T)-1. In 2024, Chang et al. -1 LG proved that, if G is not a cycle, then mL(G)(λ)≤ 2c(G)+p(G)-1, and characterized all graphs G with mL(G)(-1) = 2c(G)+p(G)-1. The remaining ploblem is to characterize all graphs G with mL(G)(λ)= 2c(G)+p(G)-1 for an arbitrary eigenvalue λ of L(G). In this paper, we give this problem a complete solution.
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