Randić energy of digraphs

We assume that D is a directed graph with vertex set ⁡()={1,…} and arc set ⁡(). A VDB topological index φ of D is defined as ⁡()= 1 2 ∑ ⁢∈⁡() + ,−, where + and − denote the outdegree and indegree of vertices u and v, respectively, and , is a bivariate symmetric function defined on nonnegative real n...

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Autores:: Rada Rincón, Juan Pablo
Cruz Rodes, Roberto
Monsalve Aristizabal, Juan Daniel

Tipo de recurso:: Article of investigation

Fecha de publicación:: 2022

Institución:: Universidad de Antioquia

Repositorio:: Repositorio UdeA

Idioma:: eng

Description
Summary:	We assume that D is a directed graph with vertex set ⁡()={1,…} and arc set ⁡(). A VDB topological index φ of D is defined as ⁡()= 1 2 ∑ ⁢∈⁡() + ,−, where + and − denote the outdegree and indegree of vertices u and v, respectively, and , is a bivariate symmetric function defined on nonnegative real numbers. Let =⁡() be the × general adjacency matrix defined as []⁢=+,− if ⁢∈⁡(), and 0 otherwise. The energy of D with respect to a VDB index φ is defined as ℰ⁡()=∑ =1⁡(), where 1⁡()≥2⁡()≥⋯≥⁡()≥0 are the singular values of the matrix .We will show that in case =ℛ is the Randić index, the spectral norm of ℛ is equal to 1, and rank of ℛ is equal to rank of the adjacency matrix of D. Immediately after, we illustrate by means of examples, that these properties do not hold for most well-known VDB topological indices. Taking advantage of nice properties the Randić matrix has, we derive new upper and lower bounds for the Randić energy ℰℛ in digraphs. Some of these generalize known results for the Randić energy of graphs. Also, we deduce a new upper bound for the Randić energy of graphs in terms of rank, concretely, we show that ℰℛ⁡()≤⁢⁢⁢⁡() for all graphs G, and equality holds if and only if G is a disjoint union of complete bipartite graphs.

Randić energy of digraphs

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