English

Some Mixed Graphs Determined by Their Spectrum

Combinatorics 2018-06-12 v1

Abstract

A mixed graph is obtained from a graph by orienting some of its edges. The Hermitian adjacency matrix of a mixed graph with the vertex set {v1,,vn} \{v_{1}, \ldots , v_{n}\} , is the matrix H=[hij]n×n H=[h_{ij}]_{n \times n} , where hij=hji=i h_{ij}=-h_{ji}=i if there is a directed edge from vi v_{i} to vj v_{j} , hij=1 h_{ij}=1 if there exists an undirected edge between viv_i and vjv_{j}, and hij=0h_{ij}=0 otherwise. The Hermitian spectrum of a mixed graph is defined to be the spectrum of its Hermitian adjacency matrix. In this paper we study mixed graphs which are determined by their Hermitian spectrum (DHS). First, we show that each mixed cycle is switching equivalent to either a mixed cycle with no directed edges (CnC_{n}), a mixed cycle with exactly one directed edge (Cn1C_{n}^{1}), or a mixed cycle with exactly two consecutive directed edges with the same direction (Cn2C_{n}^{2}) and we determine the spectrum of these three types of cycles. Next, we characterize all DHS mixed paths and mixed cycles. We show that all mixed paths of even order, except P8P_{8} and P14P_{14}, are DHS. It is also shown that mixed paths of odd order, except P3P_{3}, are not DHS. Also, all cospectral mates of P8P_{8}, P14P_{14} and P4k+1P_{4k+1} and two families of cospectral mates of P4k+3P_{4k+3}, where k1k\geq1, are introduced. Finally, we show that the mixed cycles C2kC_{2k} and C2k2C_{2k}^{2}, where k3k\geq3, are not DHS, but the mixed cycles C4C_{4}, C42C_{4}^{2}, C2k+1C_{2k+1}, C2k+12C_{2k+1}^{2}, C2k+11C_{2k+1}^{1} and C2j1C_{2j}^{1} except C71C_{7}^{1}, C91C_{9}^{1}, C121C_{12}^{1} and C151C_{15}^{1}, are DHS, where k1k\geq1 and j2j\geq2.

Keywords

Cite

@article{arxiv.1806.03634,
  title  = {Some Mixed Graphs Determined by Their Spectrum},
  author = {S. Akbari and A. Ghafari and M. Nahvi and M. A. Nematollahi},
  journal= {arXiv preprint arXiv:1806.03634},
  year   = {2018}
}
R2 v1 2026-06-23T02:24:55.354Z