具有大输出的函数的通信复杂性

Lila Fontes, Sophie Laplante, M. Laurière, Alexandre Nolin
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引用次数: 0

摘要

我们研究了具有大输出的函数的两方通信复杂性,并表明通信复杂性可以根据所考虑的输出模型而有很大的变化。我们研究了各种输出模型,从开放模型,其中外部观察者可以计算结果,到异或模型,其中协议的结果应该是参与者本地输出的位异或。该模型的灵感来自于被广泛研究的双玩家量子博弈异或博弈。我们将重点关注这些新输出模型中的误差减少问题。对于输出大小为k的函数,在异或模型中应用标准误差减小技术将在k中引入额外的成本线性。我们表明不需要依赖于k。类似地,标准的随机去除技术在异或模型中会产生2^k$的乘法成本。我们展示了如何将这个因子减小到O(k)。此外,我们证明了在其他模型中类似的误差减少和随机去除结果,并将所有模型相互分离,并证明了一些自然问题,包括集合交集和找到第一差,当它们的输入的Hamming权值是有界的时,将模型分离。最后,我们展示了如何对弱输出模型使用秩下界技术。
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The communication complexity of functions with large outputs
We study the two-party communication complexity of functions with large outputs, and show that the communication complexity can greatly vary depending on what output model is considered. We study a variety of output models, ranging from the open model, in which an external observer can compute the outcome, to the XOR model, in which the outcome of the protocol should be the bitwise XOR of the players' local outputs. This model is inspired by XOR games, which are widely studied two-player quantum games. We focus on the question of error-reduction in these new output models. For functions of output size k, applying standard error reduction techniques in the XOR model would introduce an additional cost linear in k. We show that no dependency on k is necessary. Similarly, standard randomness removal techniques, incur a multiplicative cost of $2^k$ in the XOR model. We show how to reduce this factor to O(k). In addition, we prove analogous error reduction and randomness removal results in the other models, separate all models from each other, and show that some natural problems, including Set Intersection and Find the First Difference, separate the models when the Hamming weights of their inputs is bounded. Finally, we show how to use the rank lower bound technique for our weak output models.
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