TY - GEN
T1 - Round-efficient concurrently composable secure computation via a robust extraction lemma
AU - Goyal, Vipul
AU - Lin, Huijia
AU - Pandey, Omkant
AU - Pass, Rafael
AU - Sahai, Amit
N1 - Publisher Copyright: © International Association for Cryptologic Research 2015.
PY - 2015
Y1 - 2015
N2 - We consider the problem of constructing protocols for secure computation that achieve strong concurrent and composable notions of security in the plain model. Unfortunately UC-secure secure computation protocols are impossible in this setting, but the Angel-Based Composable Security notion offers a promising alternative. Until now, however, under standard (polynomial-time) assumptions, only protocols with polynomially many rounds were known to exist. In this work, we give the first Õ (log n)-round secure computation protocol in the plain model that achieves angel-based composable security in the concurrent setting, under standard assumptions. We do so by constructing the first Õ (log n)-round CCA-secure commitment protocol. Our CCA-secure commitment protocol is secure based on the minimal assumption that one-way functions exist. A central tool in obtaining our result is a new robust concurrent extraction lemma that we introduce and prove, based on the minimal assumptions that one-way functions exist. This robust concurrent extraction lemma shows how to build concurrent extraction procedures that work even in the context of an “external” protocol that cannot be rewound by the extractor. We believe this lemma can be used to simplify many existing works on concurrent security, and is of independent interest. In fact, our lemma when used in conjunction with the concurrentsimulation schedule of Pass and Venkitasubramaniam (TCC’08), also yields a constant round construction based additionally on the existence of quasi-polynomial time (PQT) secure one-way functions.
AB - We consider the problem of constructing protocols for secure computation that achieve strong concurrent and composable notions of security in the plain model. Unfortunately UC-secure secure computation protocols are impossible in this setting, but the Angel-Based Composable Security notion offers a promising alternative. Until now, however, under standard (polynomial-time) assumptions, only protocols with polynomially many rounds were known to exist. In this work, we give the first Õ (log n)-round secure computation protocol in the plain model that achieves angel-based composable security in the concurrent setting, under standard assumptions. We do so by constructing the first Õ (log n)-round CCA-secure commitment protocol. Our CCA-secure commitment protocol is secure based on the minimal assumption that one-way functions exist. A central tool in obtaining our result is a new robust concurrent extraction lemma that we introduce and prove, based on the minimal assumptions that one-way functions exist. This robust concurrent extraction lemma shows how to build concurrent extraction procedures that work even in the context of an “external” protocol that cannot be rewound by the extractor. We believe this lemma can be used to simplify many existing works on concurrent security, and is of independent interest. In fact, our lemma when used in conjunction with the concurrentsimulation schedule of Pass and Venkitasubramaniam (TCC’08), also yields a constant round construction based additionally on the existence of quasi-polynomial time (PQT) secure one-way functions.
UR - http://www.scopus.com/inward/record.url?scp=84924690816&partnerID=8YFLogxK
U2 - 10.1007/978-3-662-46494-6_12
DO - 10.1007/978-3-662-46494-6_12
M3 - منشور من مؤتمر
T3 - Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)
SP - 260
EP - 289
BT - Theory of Cryptography - 12th Theory of Cryptography Conference, TCC 2015, Proceedings
A2 - Dodis, Yevgeniy
A2 - Nielsen, Jesper Buus
PB - Springer Verlag
T2 - 12th Theory of Cryptography Conference, TCC 2015
Y2 - 23 March 2015 through 25 March 2015
ER -