Visible to the public Function Secret Sharing: Improvements and Extensions

TitleFunction Secret Sharing: Improvements and Extensions
Publication TypeConference Paper
Year of Publication2016
AuthorsBoyle, Elette, Gilboa, Niv, Ishai, Yuval
Conference NameProceedings of the 2016 ACM SIGSAC Conference on Computer and Communications Security
Date PublishedOctober 2016
PublisherACM
Conference LocationNew York, NY, USA
ISBN Number978-1-4503-4139-4
Keywordsanonymous messaging, composability, function secret sharing, homomorphic encryption, Human Behavior, Metrics, private information retrieval, pubcrawl, relational database security, Resiliency, secure multiparty computation
Abstract

Function Secret Sharing (FSS), introduced by Boyle et al. (Eurocrypt 2015), provides a way for additively secret-sharing a function from a given function family F. More concretely, an m-party FSS scheme splits a function f : \0, 1\n -textgreater G, for some abelian group G, into functions f1,...,fm, described by keys k1,...,km, such that f = f1 + ... + fm and every strict subset of the keys hides f. A Distributed Point Function (DPF) is a special case where F is the family of point functions, namely functions f\_\a,b\ that evaluate to b on the input a and to 0 on all other inputs. FSS schemes are useful for applications that involve privately reading from or writing to distributed databases while minimizing the amount of communication. These include different flavors of private information retrieval (PIR), as well as a recent application of DPF for large-scale anonymous messaging. We improve and extend previous results in several ways: * Simplified FSS constructions. We introduce a tensoring operation for FSS which is used to obtain a conceptually simpler derivation of previous constructions and present our new constructions. * Improved 2-party DPF. We reduce the key size of the PRG-based DPF scheme of Boyle et al. roughly by a factor of 4 and optimize its computational cost. The optimized DPF significantly improves the concrete costs of 2-server PIR and related primitives. * FSS for new function families. We present an efficient PRG-based 2-party FSS scheme for the family of decision trees, leaking only the topology of the tree and the internal node labels. We apply this towards FSS for multi-dimensional intervals. We also present a general technique for extending FSS schemes by increasing the number of parties. * Verifiable FSS. We present efficient protocols for verifying that keys (k*/1,...,k*/m ), obtained from a potentially malicious user, are consistent with some f in F. Such a verification may be critical for applications that involve private writing or voting by many users.

URLhttps://dl.acm.org/doi/10.1145/2976749.2978429
DOI10.1145/2976749.2978429
Citation Keyboyle_function_2016