On Spectral Properties of Lanzhou Matrix of Graphs
Abstract
Let be a simple graph on n vertices. Lanzhou index is defined as Lz()=Σu ∈ V()d(u)2d(u). In this manuscript, the Lanzhou matrix, denoted by ALz(), has been defined, and its spectral properties are studied. The uvth entry in ALz() is d(u)d(u)+d(v)d(v) if u and v are adjacent. Otherwise, the entry is zero. Some bounds on Lanzhou energy and spread on the Lanzhou matrix are obtained. Also, Lanzhou eigenvalues and inertia for some standard graphs have been obtained. Additionally, characterizations for the symmetricity of Lanzhou eigenvalues about the origin are obtained.
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