Coin Flipping with Constant Bias Implies One-Way Functions

Iftach Haitner, Eran Omri
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引用次数: 28

Abstract

It is well known (cf., Impagliazzo and Luby [FOCS '89]) that the existence of almost all ``interesting" cryptographic applications, i.e., ones that cannot hold information theoretically, implies one-way functions. An important exception where the above implication is not known, however, is the case of coin-flipping protocols. Such protocols allow honest parties to mutually flip an unbiased coin, while guaranteeing that even a cheating (efficient) party cannot bias the output of the protocol by much. Impagliazzo and Luby proved that coin-flipping protocols that are safe against negligible bias do imply one-way functions, and, very recently, Maji, Prabhakaran, and Sahai [FOCS '10] proved the same for constant-round protocols (with any non-trivial bias). For the general case, however, no such implication was known. We make progress towards answering the above fundamental question, showing that (strong) coin-flipping protocols safe against a constant bias (concretely, $\frac{\sqrt2 -1}2 - o(1)$) imply one-way functions.
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具有恒定偏差的抛硬币意味着单向函数
众所周知(参见Impagliazzo和Luby [FOCS '89]),几乎所有“有趣的”加密应用的存在,即那些在理论上不能保存信息的应用,都意味着单向函数。然而,上述含义未知的一个重要例外是抛硬币协议的情况。这样的协议允许诚实的各方相互投掷一枚无偏见的硬币,同时保证即使是作弊(有效)的一方也不会对协议的输出产生太大的偏见。Impagliazzo和Luby证明,对于可忽略偏差安全的抛硬币协议确实意味着单向函数,并且,最近,Maji, Prabhakaran和Sahai [FOCS '10]证明了对于恒定轮协议(具有任何非微不足道的偏差)也是如此。然而,就一般情况而言,不知道这种含义。我们在回答上述基本问题方面取得了进展,表明(强)抛币协议对恒定偏差(具体而言,$\frac{\sqrt2 -1}2 - o(1)$)是安全的,意味着单向函数。
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