Permanental Energy of Graphs
This establishes fundamental bounds for a graph energy parameter, relevant to graph theory and spectral analysis.
The paper proves a sharp universal lower bound for the permanental energy of any graph: E_per(G) ≥ 2√m, with equality only for stars plus isolated vertices, and also provides an upper bound E_per(G) ≤ nρ(G).
For a simple graph $G$ with adjacency matrix $A(G)$, let $π(G,x):=\mathrm{per}(xI-A(G))$ be its permanental polynomial with roots $μ_1,\ldots,μ_n \in \mathbb{C}$, and define the permanental energy $E_{\mathrm{per}}(G):=\sum_{i=1}^n |μ_i|$. We prove a sharp universal lower bound: for every $m$-edge graph $G$, $E_{\mathrm{per}}(G) \ge 2\sqrt{m}$, with equality if and only if $G$ is a star together with isolated vertices. We also prove the general upper bound $E_{\mathrm{per}}(G) \le nρ(G)$, where $ρ(G)$ is the spectral radius, and we study $E_{\mathrm{per}}(G)$ on several graph families.