Permanental Energy of Graphs
Abstract
For a simple graph G with adjacency matrix A(G), let π(G,x):=per(xI-A(G)) be its permanental polynomial with roots μ1,…,μn ∈ C, and define the permanental energy Eper(G):=Σi=1n |μi|. We prove a sharp universal lower bound: for every m-edge graph G, Eper(G) 2m, with equality if and only if G is a star together with isolated vertices. We also prove the general upper bound Eper(G) n(G), where (G) is the spectral radius, and we study Eper(G) on several graph families.
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