Proxy re-encryption
Proxy re-encryption schemes are cryptosystems which allow third parties (proxies) to alter a ciphertext which has been encrypted for one party, so that it may be decrypted by another.
Examples of use
A proxy re-encryption is generally used when one party, say Bob, wants to reveal the contents of messages sent to him and encrypted with his public key to a third party, Chris, without revealing his private key to Chris. Bob does not want the proxy to be able to read the contents of his messages. [1] Bob could designate a proxy to re-encrypt one of his messages that is to be sent to Chris. This generates a new key that Chris can use to decrypt the message. Now if Alice sends Chris a message that was encrypted under Bob's key, the proxy will alter the message, allowing Chris to decrypt it. This method allows for a number of applications such as e-mail forwarding, law-enforcement monitoring, and content distribution.
A weaker re-encryption scheme is one in which the proxy possesses both parties' keys simultaneously. One key decrypts a plaintext, while the other encrypts it. Since the goal of many proxy re-encryption schemes is to avoid revealing either of the keys or the underlying plaintext to the proxy, this method is not ideal.
Defining functions
Proxy re-encryption schemes are similar to traditional symmetric or asymmetric encryption schemes, with the addition of two functions:
- Delegation – allows a message recipient (keyholder) to generate a re-encryption key based on his secret key and the key of the delegated user. This re-encryption key is used by the proxy as input to the re-encryption function, which is executed by the proxy to translate ciphertexts to the delegated user's key. Asymmetric proxy re-encryption schemes come in bi-directional and uni-directional varieties.
- In a bi-directional scheme, the re-encryption scheme is reversible—that is, the re-encryption key can be used to translate messages from Bob to Charlie, as well as from Charlie to Bob. This can have various security consequences, depending on the application. One notable characteristic of bi-directional schemes is that both the delegator and delegated party (e.g., Charlie and Bob) must combine their secret keys to produce the re-encryption key.
- A uni-directional scheme is effectively one-way; messages can be re-encrypted from Bob to Charlie, but not the reverse. Uni-directional schemes can be constructed such that the delegated party need not reveal its secret key. For example, Bob could delegate to Charlie by combining his secret key with Charlie's public key.
- Transitivity – Transitive proxy re-encryption schemes allow for a ciphertext to be re-encrypted an unlimited number of times. For example, a ciphertext might be re-encrypted from Bob to Charlie, and then again from Charlie to David and so on. Non-transitive schemes allow for only one (or a limited number) of re-encryptions on a given ciphertext. Currently, there is no known uni-directional, transitive proxy re-encryption scheme. It is an open problem as to whether such constructions are possible.
Proxy re-encryption should not be confused with proxy signatures, which is a separate construction with a different purpose.
See also
References
- ↑ Nabeel's Blog, Seen Nov 2014, http://mohamednabeel.blogspot.ca/2011/03/proxy-re-encryption.html
- M. Blaze, G. Bleumer, M. Strauss. Divertible Protocols and Atomic Proxy Cryptography.
- Bertino, E., Sandhu, R. "Database security - concepts, approaches, and challenges." IEEE Transactions on Dependable and Secure Computing 2 (2005): 2-19
- G. Ateniese, K. Fu, M. Green, S. Hohenberger. Improved Proxy Re-encryption Schemes with Applications to Secure Distributed Storage. Proceedings of the 12th Annual Network and Distributed Systems Security Symposium (NDSS 2005), San Diego, California, 2005.
- M. Green, G. Ateniese. Identity-Based Proxy Re-encryption. Applied Cryptography and Network Security Conference, June 2007.
- S. Hohenberger, G. Rothblum, a. shelat, and V. Vaikuntanathan. Securely Obfuscating Re-encryption. Proceedings of the Theory of Cryptography Conference (TCC), 2007.
- The JHU-MIT Proxy Re-cryptography Library
- Bibliography on Proxy Re-Cryptography