Networks and graphs provide a simple but effective model to a vast set of systems which building blocks interact throughout pairwise interactions. Unfortunately, such models fail to describe all those systems which building blocks interact at a higher order. Higher order graphs provide us the right tools for the task, but introduce a higher computing complexity due to the interaction order. In this paper we analyze the interplay between the structure of a directed hypergraph and a linear dynamical system, a random walk, evolving on it. How can one extend network measures, such as centrality or modularity, to this framework? Instead of redefining network measures through the hypergraph framework, with the consequent complexity boost, we will measure the dynamical system associated to it. This approach let us apply known measures to pairwise structures, such as the transition matrix, and determine a family of measures that are amenable of such procedure.
翻译:网络和图解为一系列庞大的系统提供了简单而有效的模型,这些系统构成了整个对齐互动的相互作用。 不幸的是,这些模型未能描述所有那些在更高顺序上进行互动的系统。 更高的顺序图为我们提供了正确的任务工具,但由于互动顺序,引入了更高的计算复杂性。 在本文件中,我们分析了定向高光学结构与直线动态系统结构之间的相互作用,一种随机行走,并不断演变。 怎样才能将网络措施,如核心或模块化等扩展到这个框架? 而不是通过高光学框架重新界定网络措施,并随之带来复杂性的增强,我们将测量与之相关的动态系统。 这种方法让我们将已知的措施应用于对齐结构,如过渡矩阵,并确定适合这种程序的措施的组合。