We introduce a general framework for the modeling and analysis of vehicular networks by defining street systems as random 1D subsets of $\mathbb{R}^{2}$. The street system, in turn, specifies the random intensity measure of a Cox process of vehicles, i.e., vehicles form independent 1D Poisson point processes on each street. Models in this Coxian framework can characterize streets of different lengths and orientations forming intersections or T-junctions. The lengths of the streets can be infinite or finite and mutually independent or dependent. We analyze the reliability of communication for different models, where reliability is the probability that a vehicle at an intersection, a T-junction, or a general location can receive a message successfully from a transmitter at a certain distance. Further, we introduce a notion of equivalence between vehicular models, which means that a representative model can be used as a proxy for other models in terms of reliability. Specifically, we prove that the Poisson stick process-based vehicular network is equivalent to the Poisson line process-based and Poisson lilypond model-based vehicular networks, and their rotational variants.
翻译:我们为车辆网络的建模和分析引入了一个总体框架,将街道系统定义为随机的1D子集($$\mathbb{R ⁇ 2}美元)。街道系统则指定了车辆考克斯过程的随机强度度量,即车辆在每一条街道上独立形成1D Poisson点过程。这个科克斯框架的模型可以描述不同长度和方向的街道特征,形成交叉或交汇点。街道的长度可以是无限的或有限的,并且可以相互独立或依赖。我们分析了不同模型的通信可靠性,在这些模型中,车辆在交叉点、T枢纽或一般位置的可靠性是车辆在一定距离从发报机成功接收信息的可能性。此外,我们引入了对等模式概念,这意味着代表性模型可以在可靠性方面用作其他模型的替代物。具体地说,我们证明Poisson stick基于流程的车辆网络相当于Poisson线和Poisson liproporate-commal-blational-visal-visal commation-commation-side-brobal-visal-commal-commationserationserations
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