In simple terms, a hash function works by making a big tangled mess of the input data.

See MD5 for instance. It processes input data by 512-bit blocks. Each block is split into 16 32-bit words. There are 64 steps, each step using one of the 16 input words. So each word is used four times within the course of the algorithm. This is where one-wayness comes from: any input bit is input at several places, and between two such inputs the function mixes all the current data together so that each input bit impacts most of the 128-bit running state. This prevents you from inverting the function, or computing a collision, by looking at only a part of the data. You have to look at the whole 128 bits, and the space of 128-bit blocks is too wide to be efficiently walked through.

Now MD5 does not do a good job at it, since collisions for that function can be found. From a cryptographer point of view, MD5 is a rotated encryption function. The processing of one message block M (512 bits) uses an input state V (a 128-bit value) and computes the new state V' as V' = V + E(M, V) where '+' is a word-wise addition, and 'E' happens to be a symmetric encryption function (aka a 'block cipher') which uses M as key and V as the message to be encrypted. From a closer look, E can is a kind of "extended Feistel network", similar to the DES block cipher, with four quarters instead of two halves. Details are not important here; my point is that what makes a "good" hash function, among hash functions which use that structure (called "Merkle-Damgård"), is similar to what makes a block cipher "secure". The successful collision attacks on MD5 use differential cryptanalysis, a tool which was designed to attack block ciphers in the first place.

From a good block cipher to a good hash function, there is a step which is not to be dismissed. With the Merkle-Damgård structure, the hash function is secure if the underlying block cipher is resistant to "related key attacks", a rather obscure property against which block ciphers are rarely strengthened because, for symmetric encryption, related key attacks barely have any practical impact. For instance, the AES encryption turned out not to be as resistant to related key attacks as could be wished for, and this did not trigger general panic. That resistance was not part of the properties which were sought for when AES was designed. It just prevents turning the AES into a hash function. There is a hash function called Whirlpool, which builds on a derivate of Rijndael, "Rijndael" being the initial name of what became the AES; but Whirlpool takes care to modify the parts of Rijndael which are weak to related key attacks.

Also, there are other structures which can be used for building a hash function. The current standard functions (MD5, SHA-1, and the "SHA-2" family, aka SHA-224, SHA-256, SHA-384 and SHA-512) are Merkle-Damgård functions, but many of the would-be successors are not. There is an ongoing competition, organized by the NIST (the US federal organization which deals with that kind of things), to select a new standard hash function, dubbed "SHA-3". See this page for details. Right now, they are down to 14 candidates from an initial 51 (not counting a dozen extra which failed the administrative test of sending a complete submission with code which compiles and runs properly).

Let's now have a more conceptual look. A secure hash function should look like a *random oracle*: an oracle is a black box which, when given a message *M* as input, outputs an answer *h(M)* which is chosen at random, uniformly, in the output space (i.e. all *n*-bit strings if the hash function output length is *n*). If given the same message *M* again as input, the oracle outputs the same value than previously. Apart from that restriction, the output of the oracle on a non previously used input *M* is unpredictable. One can imagine the oracle as a container for a gnome who throws dice, and carefully records the input messages and corresponding outputs in a big book, so that he will honor his oracle contract. There is no way to predict what the next output will be since the gnome himself does not know that.

If a random oracle exists, then inverting the hash function has cost *2^n*: in order to have a given output, there is no better strategy than using distinct input messages until one yields the expected value. Due to the uniform random selection, probability of success is *1/(2^n)* at each try, and the average number of requests to the dice-throwing gnome will be *2^n*. For collisions (finding two distinct inputs which yields the same hash value), the cost is about *1.4*2^(n/2)* (roughly speaking, with *1.4*2^(n/2)* outputs, we can assemble about *2^n* pairs of output, each having a probability of *1/(2^n)* of matching, i.e. having two distinct inputs which have the same output). These are the best that can be done with a random oracle.

Therefore, we look for hash functions which are as good as a random oracle: they must mix the input data in such a way that we cannot find a collision more efficiently than what it would cost to simply invoke the function *2^(n/2)* times. The bane of hash function is mathematical structure, i.e. shortcuts which allow the attacker to view the hash function internal state (which is big, at least *n* bits) as a variation on a mathematical object which lives in a much shorter space. 30 years of public research on symmetric encryption systems have produced a whole paraphernalia of notions and tools (diffusion, avalanche, differentials, linearity...) which can be applied. Bottom-line, however, is that we have no proof that a random oracle may actually exist. We *want* a hash function which cannot be attacked. What we *have* are hash function candidates, for which no attack is currently *known*, and, somewhat better, we have some functions for which *some* kinds of attack can be proven not to work.

There is still some research to be done.