Cryptography without assumptions -- seeking an overview

Question

Suppose $P = NP$ and a fast linear-time algorithm for SAT appears tomorrow. Suddenly RSA is insecure, much of our modern communication system is broken, and we need to reconsider how to keep secrets from each other.

Question: Is there a good single reference (or short list) to gain a big-picture view of what is possible in crypto (and in the allied field of "security") without intractability assumptions? This could save civilization one day, and would also be nice to peruse in the meantime.

Discussion: Most of the cryptographic tasks we now study (OWFs, PRGs, PKE) are provably impossible in the $P = NP$ world (a world dubbed "Algorithmica" in an influential essay by Impagliazzo), but some things remain possible: communication with a one-time pad; distributed secret sharing; private info retrieval; and some other nice things. (Certain kinds of physical mechanisms such as locked boxes, devices implementing oblivious transfer, and quantum states can also come in handy. Of course there is always some kind of physical assumption about who can see what information.)

One can distinguish between information-theoretic security (which works against a computationally unbounded adversary) and "unconditional" security (which may require a bounded adversary, but still shows security under no unproven assumptions). I'm most interested in the info-theoretic case.

For starters, here is one bibliography of information-theoretic security (which, for my purposes, is unmanageably long and disparate).

Answer 1

The key phrases you are probably looking for are "information-theoretic cryptography" and "quantum cryptography". Searching the literature on these topics will turn up lots of work of the sort you are looking for. Some example highlights below:

• For confidentiality: the one-time pad, the Wyner wiretap channel, secret sharing, quantum key exchange, etc.

• For integrity and authentication: universal hash functions.

• For anonymity: anonymous communication (e.g., DC nets, onion-based schemes, p2p networks based upon rapidly mixing random walks), distance bounding protocols.

• For security based upon physical assumptions: PUFs (physically unclonable functions), integrity codes (Capkun et al.), quantum cryptography, security using TPMs or tamper-resistant hardware.

There are lots of papers on those topics; too many to summarize all the results in the literature.

Answer 2

This is a fairly complex question, as we really don't have a good overview of the area. Partially this is due to the fact the information-theory and the crypto community have been working on similar topics without really interacting enough with each other. Many good points have been given above. I would just like to add a few extra observations:

• We have had a large body of works dealing with the problem of secret-key agreement (and secure communication) with a given setup. Here, a setup means for example that the parties in the system (say Alice, Bob, and the adversary Eve) share some correlated information coming from a tripartite probability distribution. An alternative setup could consist of noisy channels (e.g., Alice can send information to Bob and Eve through noisy channels). Additionally, Alice and Bob are connected through a communication channel (which may or may not be authenticated). This line of work started with Aaron Wyner in the 70s, who introduced the Wiretap channel model, and was further cleaned up by Maurer and others in the 90s. Also, lots of techniques in this area (privacy amplification, information reconciliation) ended up being used in the Quantum Key-Distribution (QKD) setting. A fair amount of work is being done here even to date, for example in related areas such as non-malleable extractors, etc. The bounded-storage model is also a setting which is different from the above, but uses similar techniques and has similar goals.

• Beyond just secret sharing, you will find a large body of works on information-theoretically secure multi-party computation (MPC). In particular, the line of works initiated by the BGW protocol is completely information theoretical.

• Also, I am not sure how far the scope of the question goes: If for example P = NP indeed holds, but we can somehow justify the presence of a random oracle in the sky, then symmetric cryptography is still possible. Sometimes, such models are indeed used to prove security of certain cryptographic constructions (like hash functions or block ciphers), and the techniques are completely information-theoretic.

• Information-theoretic techniques in cryptography also come up often as an intermediate tool in complexity-theoretic results, but I think this is beyond the scope of the question. (See Maurer's work on random systems and on indistinguishability amplification as an example of this type of work.)

Answer 3

Some research groups in Europe have pursued this line of research; more specifically, because of my interest in information theory I have ran into the work of Ueli Maurer and his school, which is both significant from purely information theoretic point of view (which I am more familiar with) and also offers some practical approaches to information theoretic security.

Related to the above line of work, some places you might want to consider looking at are the PhD thesis of Christian Cachin and also Renato Renner (more quantum).

Of course, there is a whole different approach with keywords including BB84, Preskill-Shor, Artur Ekert, etc.

The above of course only reflects my limited experience, and surely there are many more approaches and interesting lines of work.