Improvement of the Round Complexity of Perfectly Concealing Bit Commitment Schemes<論文>

概要

論文の詳細を見る
We improve the upper bound on the round complexity for perfectly concealing bit commitment schemes based on the general computational assumption. The best known scheme is the one-way permutation based scheme due to Naor, Ostrovsky, Venkatesan and Yung and its round complexity is O(n). We consider a naive parallel version of their scheme of the multiplicity log n and obtain an O(n/ log n)-round scheme. Our improvement answers a question, raised by them, whether their O(n)-round scheme is essential with respect to the round complexity. Though such a parallelization raises an analytic difficulty, we introduce a new analysis technique and then overcome the difficulty. Our technique copes with expected almost pairwise independent random variables instead of the pairwise independence, which is a key property in their analysis. While the expected almost pairwise independence plays an important role in our security proof, it also provides alternative security proof for the original scheme.
埼玉大学工学部の論文