| Non-interactive correlation distillation, inhomogeneous Markov chains, and the reverse Bonami-Beckner inequality (2008) | |||||||||||||||
Abstract | |||||||||||||||
| In this paper we study the problem of non-interactive correlation distillation (NICD), a generalization of noise sensitivity previously considered in [5, 31, 39]. We extend the model to NICD on trees. In this model there is a fixed undirected tree with players at some of the nodes. One node is given a uniformly random string and this string is distributed throughout the network, with the edges of the tree acting as independent binary symmetric channels. The goal of the players is to agree on a shared random bit without communicating. Our new contributions include the following: • In the case of a k-leaf star graph (the model considered in [31]), we resolve the major open question of whether the success probability must go to zero as k → ∞. We show that this is indeed the case and provide matching upper and lower bounds on the asymptotically optimal rate (a slowlydecaying polynomial). • In the case of the k-vertex path graph, we completely solve the problem, showing that all players should use the same 1-bit function. • In the general case we show that all players should use monotone functions. We also show, somewhat | |||||||||||||||
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