TY - GEN
T1 - FHE over the integers
T2 - 20th IACR International Conference on Practice and Theory of Public-Key Cryptography, PKC 2017
AU - Benarroch, Daniel
AU - Brakerski, Zvika
AU - Lepoint, Tancrède
N1 - Publisher Copyright: © International Association for Cryptologic Research 2017.
PY - 2017/2/26
Y1 - 2017/2/26
N2 - Fully homomorphic encryption over the integers (FHE-OI) is currently the only alternative to lattice-based FHE. FHE-OI includes a family of schemes whose security is based on the hardness of different variants of the approximate greatest common divisor (AGCD) problem. A lot of effort was made to port techniques from second generation lattice-based FHE (using tensoring) to FHE-OI. Gentry, Sahai and Waters (Crypto 13) showed that third generation techniques (which were later formalized using the “gadget matrix”) can also be ported. However, the majority of these works was based on the noise-free variant of AGCD which is potentially weaker than the general one. In particular, the noise-free variant relies on the hardness of factoring and is thus vulnerable to quantum attacks. In this work, we propose a comprehensive study of applying third generation FHE techniques to the regime of FHE-OI. We present and analyze a third generation FHE-OI based on decisional AGCD without the noise-free assumption. We proceed to showing a batch version of our scheme where each ciphertext can encode a vector of messages and operations are performed coordinate-wise. We use a similar AGCD variant to Cheon et al. (Eurocrypt 13) who suggested the batch approach for second generation FHE, but we do not require the noise-free component or a subset sum assumption. However, like Cheon et al., we do require circular security for our scheme, even for bounded homomorphism. Lastly, we discuss some of the obstacles towards efficient implementation of our schemes and discuss a number of possible optimizations.
AB - Fully homomorphic encryption over the integers (FHE-OI) is currently the only alternative to lattice-based FHE. FHE-OI includes a family of schemes whose security is based on the hardness of different variants of the approximate greatest common divisor (AGCD) problem. A lot of effort was made to port techniques from second generation lattice-based FHE (using tensoring) to FHE-OI. Gentry, Sahai and Waters (Crypto 13) showed that third generation techniques (which were later formalized using the “gadget matrix”) can also be ported. However, the majority of these works was based on the noise-free variant of AGCD which is potentially weaker than the general one. In particular, the noise-free variant relies on the hardness of factoring and is thus vulnerable to quantum attacks. In this work, we propose a comprehensive study of applying third generation FHE techniques to the regime of FHE-OI. We present and analyze a third generation FHE-OI based on decisional AGCD without the noise-free assumption. We proceed to showing a batch version of our scheme where each ciphertext can encode a vector of messages and operations are performed coordinate-wise. We use a similar AGCD variant to Cheon et al. (Eurocrypt 13) who suggested the batch approach for second generation FHE, but we do not require the noise-free component or a subset sum assumption. However, like Cheon et al., we do require circular security for our scheme, even for bounded homomorphism. Lastly, we discuss some of the obstacles towards efficient implementation of our schemes and discuss a number of possible optimizations.
UR - http://www.scopus.com/inward/record.url?scp=85014430619&partnerID=8YFLogxK
U2 - 10.1007/978-3-662-54388-7_10
DO - 10.1007/978-3-662-54388-7_10
M3 - منشور من مؤتمر
SN - 9783662543870
T3 - Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)
SP - 271
EP - 301
BT - Public-Key Cryptography – PKC 2017 - 20th IACR International Conference on Practice and Theory in Public-Key Cryptography, Proceedings
A2 - Fehr, Serge
PB - Springer Verlag
Y2 - 28 March 2017 through 31 March 2017
ER -