In this work we consider temporal networks, the links of which are available only at random times (randomly available temporal networks). Our networks are {em ephemeral}: their links appear sporadically, only at certain times, within a given maximum time (lifetime of the net). More specifically, our temporal networks notion concerns networks, whose edges (arcs) are assigned one or more random discrete-time labels drawn from a set of natural numbers. The labels of an edge indicate the discrete moments in time at which the edge is available. In such networks, information (e.g., messages) have to follow temporal paths, i.e., paths, the edges of which are assigned a strictly increasing sequence of labels. We first examine a very hostile network: a clique, each edge of which is known to be available only one random time in the time period {1,2, ..., n} (n is the number of vertices). How fast can a vertex send a message to all other vertices in such a network? To answer this, we define the notion of the Temporal Diameter for the random temporal clique and prove that it is Θ(log n) with high probability and in expectation. In fact, we show that information dissemination is very fast with high probability even in this hostile network with regard to availability. This result is similar to the results for the random phone-call model. Our model, though, is weaker. Our availability assumptions are different and randomness is provided only by the input. We show here that the temporal diameter of the clique is crucially affected by the clique's lifetime, a, e.g., when a is asymptotically larger than the number of vertices, n, then the temporal diameter must be Ω(a/nlog n ). We, then, consider the least number, r, of random points in time at which an edge is available, in order to guarantee at least a temporal path between any pair of vertices of the network (notice that the clique is the only network for which just one instance of availability per edge, even non-random, suffices for this). We show that r is Ω(log n) even for some networks of diameter 2. Finally, we compare this cost to an (optimal) deterministic allocation of labels of availability that guarantees a temporal path between any pair of vertices. For this reason, we introduce the notion of the Price of Randomness and we show an upper bound for general networks.
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机译:在这项工作中,我们考虑时间网络,其链接仅在随机时间可用(随机可用的时间网络)。我们的网络是{ em ephemeral}:它们的链接仅在给定的最大时间内(网络的生命周期)内的某些时间偶尔出现。更具体地说,我们的时间网络概念涉及网络,其边缘(弧)被分配一个或多个从一组自然数得出的随机离散时间标签。边缘的标签指示边缘可用的离散时间。在这样的网络中,信息(例如消息)必须遵循时间路径,即路径,其边缘被分配严格增加的标签序列。我们首先研究一个非常敌对的网络:一个群体,已知每个边缘在时间段{1,2,...,n}(n是顶点数)中只有一个随机时间可用。顶点可以多快将消息发送到此类网络中的所有其他顶点?为了回答这个问题,我们为随机的时间群体定义了“时间直径”的概念,并证明它是Θ(log n)的概率很高并且是期望值。实际上,我们证明即使在这种敌对的网络中,就可用性而言,信息传播的可能性也非常高。此结果类似于随机电话呼叫模型的结果。但是,我们的模型较弱。我们的可用性假设有所不同,并且随机性仅由输入提供。我们在这里表明,团的时间直径受团的生命周期a的关键影响,例如,当a渐近大于顶点数量n时,则时间直径必须为Ω(a / nlog n)。然后,我们考虑边缘可用的最小时间随机点r,以便保证网络的任意一对顶点之间至少有一条时间路径(请注意,集团是唯一的网络仅每个边缘的一个可用性实例,甚至是非随机的就足够了)。我们证明,即使对于某些直径为2的网络,r仍为Ω(log n)。最后,我们将此成本与可用性标签的(最佳)确定性分配进行比较,该标签保证了任何一对顶点之间的时间路径。因此,我们引入了随机价格的概念,并给出了一般网络的上限。
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