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Title:
SO-CCA Secure PKE in the Quantum Random Oracle Model or the Quantum Ideal Cipher Model

Authors: Shingo Sato and Junji Shikata

Selective opening (SO) security is one of the most important security notions of public key encryption (PKE) in a multi-user setting. Even though messages and random coins used in some ciphertexts are leaked, SO security guarantees the confidentiality of the other ciphertexts. Actually, it is shown that there exist PKE schemes which meet the standard security such as indistinguishability against chosen ciphertext attacks (IND-CCA security) but do not meet SO security against chosen ciphertext attacks. Hence, it is important to consider SO security in the multi-user setting. On the other hand, many researchers have studied cryptosystems in the security model where adversaries can submit quantum superposition queries (i.e., quantum queries) to oracles. In particular, IND-CCA secure PKE and KEM schemes in the quantum random oracle model have been intensively studied so far. In this paper, we show that two kinds of constructions of hybrid encryption schemes meet simulation-based SO security against chosen ciphertext attacks (SIM-SO-CCA security) in the quantum random oracle model or the quantum ideal cipher model. The first scheme is constructed from any IND-CCA secure KEM and any simulatable data encapsulation mechanism (DEM). The second one is constructed from any IND-CCA secure KEM based on Fujisaki-Okamoto transformation and any strongly unforgeable message authentication code (MAC). We can apply any IND-CCA secure KEM scheme to the first one if the underlying DEM scheme meets simulatability, whereas we can apply strongly unforgeable MAC to the second one if the underlying KEM is based on Fujisaki-Okamoto transformation.

ePrint: https://eprint.iacr.org/2022/617

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