Bounds on the efficiency of “black-box” commitment schemes (2005)
| Venue: | In Proceedings of the 32nd International Colloquium on Automata, Languages and Programming |
| Citations: | 5 - 0 self |
BibTeX
@INPROCEEDINGS{Horvitz05boundson,
author = {Omer Horvitz and Jonathan Katz},
title = {Bounds on the efficiency of “black-box” commitment schemes},
booktitle = {In Proceedings of the 32nd International Colloquium on Automata, Languages and Programming},
year = {2005},
pages = {128--139}
}
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Abstract
Constructions of cryptographic primitives based on general assumptions (e.g., one-way functions) tend to be less efficient than constructions based on specific (e.g., number-theoretic) assumptions. This has prompted a recent line of research aimed at investigating the best possible efficiency of (black-box) cryptographic constructions based on general assumptions. Here, we present bounds on the efficiency of statistically-binding commitment schemes constructed using black-box access to one-way permutations; our bounds are tight for the case of perfectly-binding schemes. Our bounds hold in an extension of the Impagliazzo-Rudich model: we show that any construction beating our bounds would imply the unconditional existence of a one-way function (from which a statistically-binding commitment scheme could be constructed “from scratch”). 1
