Actually collisions are easier than what you list on both MD5 and SHA-1. MD5 collisions can be found in time equivalent to *2*^{26.5} operation (where one "operation" is the computation of MD5 over a short message). See this page for some details and an implementation of the attack (I wrote that code; it finds a collision within an average of 14 seconds on a 2.4 GHz Core2 x86 in 64-bit mode).

Similarly, the best known attack on SHA-1 is in about *2*^{61} operations, not *2*^{69}. It is still theoretical (no actual collision was produced yet) but it is within the realm of the feasible.

As for implications on security: hash functions are usually said to have three properties:

- No preimage: given
*y*, it should not be feasible to find *x* such that *h(x) = y*.
- No second preimage: given
*x*_{1}, it should not be feasible to find *x*_{2} (distinct from *x*_{1}) such that *h(x*_{1}) = h(x_{2}).
- No collision: it should not be feasible to find any
*x*_{1} and *x*_{2} (distinct from each other) such that *h(x*_{1}) = h(x_{2}).

For a hash function with a *n*-bit output, there are generic attacks (which work regardless of the details of the hash function) in *2*^{n} operations for the two first properties, and *2*^{n/2} operations for the third. If, for a given hash function, an attack is found, which, by exploiting special details of how the hash function operates, finds a preimage, a second preimage or a collision faster than the corresponding generic attack, then the hash function is said to be "broken".

However, not all usages of hash functions rely on all three properties. For instance, digital signatures begin by hashing the data which is to be signed, and then the hash value is used in the rest of the algorithm. This relies on the resistance to preimages and second preimages, but digital signatures are not, per se, impacted by collisions. Collisions may be a problem in some specific signature scenarios, where the attacker gets to choose the data that is to be signed by the victim (basically, the attacker computes a collision, has one message signed by the victim, and the signature becomes valid for the other message as well). This can be counteracted by prepending some random bytes to the signed message before computing the signature (the attack and the solution where demonstrated in the context of X.509 certificates).

HMAC security relies on an *other* property that the hash function must fulfill; namely, that the "compression function" (the elementary brick on which the hash function is built) acts as a *Pseudo-Random Function* (PRF). Details on what a PRF is are quite technical, but, roughly speaking, a PRF should be indistinguishable from a *Random Oracle*. A random oracle is modeled as a black box which contains a gnome, some dice and a big book. On some input data, the gnome select a random output (with the dice) and writes down in the book the input message and the output which was randomly selected. The gnome uses the book to check whether he already saw the same input message: if so, then the gnome returns the same output than previously. By construction, you can know nothing about the output of a random oracle on a given message until you try it.

The random oracle model allows the HMAC security proof to be quantified in invocations of the PRF. Basically, the proof states that HMAC cannot be broken without invoking the PRF a huge number of times, and by "huge" I mean computationally infeasible.

Unfortunately, we do not have random oracles, so in practice we must use hash functions. There is no proof that hash functions really exist, with the PRF property; right now, we only have candidates, i.e. functions for which we cannot prove (yet) that their compression functions are not PRF.

*If* the compression function is a PRF *then* the hash function is automatically resistant to collisions. That's part of the magic of PRF. *Therefore*, if we can find collisions for a hash function, then we know that the internal compression function is not a PRF. This does not turn the collisions into an attack on HMAC. Being able to generate collisions at will does not help in breaking HMAC. However, those collisions demonstrate that the security proof associated with HMAC does not apply. The guarantee is void. That's just the same than a laptop computer: opening the case does not necessarily break the machine, but afterwards you are on your own.

In the Kim-Biryukov-Preneel-Hong article, some attacks on HMAC are presented, in particular a forgery attack on HMAC-MD4. The attack exploits the shortcomings of MD4 (its "weaknesses") which make it a non-PRF. Variants of the same weaknesses were used to generate collisions on MD4 (MD4 is thoroughly broken; some attacks generate collisions faster than the computation of the hash function itself !). So the collisions do not imply the HMAC attack, but both attacks feed on the same source. Note, though, that the forgery attack has cost *2*^{58}, which is quite high (no actual forgery was produced, the result is still theoretical) but substantially lower than the resistance level expected from HMAC (with a robust hash function with an *n*-bit output, HMAC should resist up to *2*^{n} work factor; *n = 128* for MD4).

So, while collisions do not *per se* imply weaknesses on HMAC, they are bad news. In practice, collisions are a problem for very few setups. But knowing whether collisions impact a given usage of hash functions is tricky enough, that it is quite unwise to keep on using a hash function for which collisions were demonstrated.

For SHA-1, the attack is still theoretical, and SHA-1 is widely deployed. The situation has been described like this: "The alarm is on, but there is no visible fire or smoke. It is time to walk towards the exits -- but not to run."

For more information on the subject, begin by reading the chapter 9 of the Handbook of Applied Cryptography, by Menezes, van Oorschot and Vanstone, a must-read for the apprentice cryptographer (not to be confused with "Applied Cryptography" by B. Schneier, which is a well-written introduction but nowhere as thorough as the "Handbook").

`HMAC with the full version of MD4 can be forged with this knowledge`

. This document - eprint.iacr.org/2006/187.pdf - explains the mathematics behind it, but I don't entirely follow it. Perhaps you may be interested in it. – Sripathi Krishnan May 22 '10 at 22:12