Spectra and energy of bipartite signed digraphs

TL;DR

This paper investigates the spectral properties and energy of bipartite signed digraphs, deriving characteristic polynomial forms, exploring spectral relations, and constructing families of cospectral and equienergetic digraphs with various properties.

Contribution

It provides explicit polynomial forms for bipartite signed digraphs with specific cycle conditions, introduces a quasi-order relation, and constructs new families of cospectral and equienergetic signed digraphs.

Findings

Characteristic polynomial forms depend on cycle signs and lengths.

Energy increases with the defined quasi-order.

Existence of large families of cospectral and equienergetic digraphs.

Abstract

The set of distinct eigenvalues of a signed digraph $S$ together with their multiplicities is called its spectrum. The energy of a signed digraph $S$ with eigenvalues $z_1,z_2,\cdots,z_n$ is defined as $E(S)=\sum_{j=1}^{n}|\Re z_j|$, where $\Re z_j $ denotes real part of complex number $z_j$. In this paper, we show that the characteristic polynomial of a bipartite signed digraph of order $n$ with each cycle of length $\equiv 0\pmod 4$ negative and each cycle of length $\equiv 2\pmod 4$ positive is of the form \\ $$\phi_S(z)=z^n+\sum\limits_{j=1}^{\lfloor{\frac{n}{2}}\rfloor}(-1)^j c_{2j}(S)z^{n-2j},$$\\ where $c_{2j}(S)$ are nonnegative integers. We define a quasi-order relation in this case and show energy is increasing. It is shown that the characteristic polynomial of a bipartite signed digraph of order $n$ with each cycle negative has the form $$\phi_S(z)=z^n+\sum\limits_{j=1}^{\lfloor{\frac{n}{2}}\rfloor}c_{2j}(S)z^{n-2j},$$ where $c_{2j}(S)$ are nonnegative integers. We study integral, real, Gaussian signed digraphs and quasi-cospectral digraphs and show for each positive integer $n\ge 4$ there exists a family of $n$ cospectral, non symmetric, strongly connected, integral, real, Gaussian signed digraphs (non cycle balanced) and quasi-cospectral digraphs of order $4^n$. We obtain a new family of pairs of equienergetic strongly connected signed digraphs and answer to open problem $(2)$ posed in Pirzada and Mushtaq, Energy of signed digraphs, Discrete Applied Mathematics 169 (2014) 195-205.