Sampling of Min-Entropy Relative to Quantum Knowledge

Abstract

Let X_1,..., X_n be a sequence of n classical random variables and consider a sample Xs_1,..., Xs_r of r ≤ n positions selected at random. Then, except with (exponentially in r) small probability, the min-entropy H_min(Xs_1 ...Xs_r) of the sample is not smaller than, roughly, a fraction r/n of the overall entropy H_min(X_1 ...X_n), which is optimal. Here, we show that this statement, originally proved in [S. Vadhan, LNCS 2729, Springer, 2003] for the purely classical case, is still true if the min-entropy Hmin is measured relative to a quantum system. Because min-entropy quantifies the amount of randomness that can be extracted from a given random variable, our result can be used to prove the soundness of locally computable extractors in a context where side information might be quantum-mechanical. In particular, it implies that key agreement in the bounded-storage model-using a standard sample-and-hash protocol-is fully secure against quantum adversaries, thus solving a long-standing open problem.

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