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Function-Revealing Encryption: Definitions and Constructions

Abstract : Multi-input functional encryption is a paradigm that allows an authorized user to compute a certain function-and nothing moreover multiple plaintexts given only their encryption. The particular case of two-input functional encryption has very exciting applications, including comparing the relative order of two plaintexts from their encrypted form (order-revealing encryption). While being extensively studied, multi-input functional encryption is not ready for a practical deployment, mainly for two reasons. First, known constructions rely on heavy cryptographic tools such as multilinear maps. Second, their security is still very uncertain, as revealed by recent devastating attacks. In this work, we investigate a simpler approach towards obtaining practical schemes for functions of particular interest. We introduce the notion of function-revealing encryption, a generalization of order-revealing encryption to any multi-input function as well as a relaxation of multi-input functional encryption. We then propose a simple construction of order-revealing encryption based on function-revealing encryption for simple functions, namely orthogonality testing and intersection cardinality. Our main result is an efficient order-revealing encryption scheme with limited leakage based on the standard DLin assumption.
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https://hal.inria.fr/hal-01929272
Contributor : Alain Passelègue <>
Submitted on : Wednesday, November 21, 2018 - 10:06:49 AM
Last modification on : Friday, June 25, 2021 - 3:40:05 PM

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Marc Joye, Alain Passelègue. Function-Revealing Encryption: Definitions and Constructions. SCN 2018 - International Conference on Security and Cryptography for Networks, Sep 2018, Amalfi, Italy. pp.527-543, ⟨10.1007/978-3-319-98113-0_28⟩. ⟨hal-01929272⟩

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