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Paper 2013/361

Linearly Homomorphic Structure-Preserving Signatures and Their Applications

Benoit Libert and Thomas Peters and Marc Joye and Moti Yung

Abstract

Structure-preserving signatures (SPS) are signature schemes where messages, signatures and public keys all consist of elements of a group over which a bilinear map is efficiently computable. This property makes them useful in cryptographic protocols as they nicely compose with other algebraic tools (like the celebrated Groth-Sahai proof systems). In this paper, we consider SPS systems with homomorphic properties and suggest applications that have not been provided before (in particular, not by employing ordinary SPS). We build linearly homomorphic structure-preserving signatures under simple assumptions and show that the primitive makes it possible to verify the calculations performed by a server on outsourced encrypted data (i.e., combining secure computation and authenticated computation to allow reliable and secure cloud storage and computation, while freeing the client from retaining cleartext storage). Then, we give a generic construction of non-malleable (and actually simulation-sound) commitment from any linearly homomorphic SPS. This notably provides the first constant-size non-malleable commitment to group elements.

Note: Fixed one issue in Appendix B

Metadata
Available format(s)
PDF
Category
Public-key cryptography
Publication info
Published elsewhere. Crypto 2013 -- This is the full version
Keywords
Structure-preserving cryptographysignatureshomomorphismcommitment schemesnon-malleability
Contact author(s)
benoit libert @ technicolor com
History
2013-07-17: last of 2 revisions
2013-06-10: received
See all versions
Short URL
https://ia.cr/2013/361
License
Creative Commons Attribution
CC BY
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