We consider the coded cooperative data exchange problem for general graphs. In this problem, given a graph G =(V, E) representing clients in a broadcast network, each of which initially hold a (not necessarily disjoint) set of information packets; one wishes to design a communication scheme in which eventually all clients will hold all the packets of the network. Communication is performed in rounds, where in each round a single client broadcasts a single (possibly encoded) information packet to its neighbors in G. The objective is to design a broadcast scheme that satisfies all clients with the minimum number of broadcast rounds. The coded cooperative data exchange problem has seen significant research over the last few years; mostly when the graph G is the complete broadcast graph in which each client is adjacent to all other clients in the network, but also on general topologies, both in the fractional and integral setting. In this work we focus on the integral setting in general undirected topologies G. We tie the data exchange problem on G to certain well studied combinatorial properties of G and in such show that solving the problem exactly or even approximately within a multiplicative factor of log |V| is intractable (i.e., NP-Hard). We then turn to study efficient data exchange schemes yielding a number of communication rounds comparable to our intractability result. Our communication schemes do not involve encoding, and in such yield bounds on the coding advantage in the setting at hand.
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机译:我们考虑一般图形的编码协作数据交换问题。在这个问题中,给定一个曲线图G =(V,E)代表广播网络中的客户端,每个客户端最初都拥有一组(不一定是不相交的)信息包;人们希望设计一种通信方案,在该方案中,最终所有客户端都将保存网络的所有数据包。通信是在回合中进行的,在每个回合中,单个客户端向其G中的邻居广播单个(可能编码的)信息包。目标是设计一种广播方案,以最少的广播回合次数满足所有客户端。编码协作数据交换问题在过去几年中已经得到了广泛的研究。大多数情况下,图G是完整的广播图,其中每个客户端都与网络中的所有其他客户端相邻,而且在小数和整数设置中都处于常规拓扑上。在这项工作中,我们将重点放在一般无向拓扑G的积分设置上。我们将G上的数据交换问题与某些经过充分研究的G的组合性质联系起来,从而证明在log |的乘积因子内准确地或近似地解决了该问题。 V |是难处理的(即NP-Hard)。然后,我们转向研究有效的数据交换方案,该方案产生了许多与我们的棘手结果可比的通信回合。我们的通信方案不涉及编码,并且在这种屈服范围内限制了当前设置中的编码优势。
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