Eliezer recently posted an essay on "the fallacy of privileging the hypothesis". What it's really about is the fallacy of privileging an arbitrary hypothesis. In the fictional example, a detective proposes that the investigation of an unsolved murder should begin by investigating whether a particular, randomly chosen citizen was in fact the murderer. Towards the end, this is likened to the presumption that one particular religion, rather than any of the other existing or even merely possible religions, is especially worth investigating.
However, in between the fictional and the supernatural illustrations of the fallacy, we have something more empirical: quantum mechanics. Eliezer writes, as he has previously, that the many-worlds interpretation is the one - the rationally favored interpretation, the picture of reality which rationally should be adopted given the empirical success of quantum theory. Eliezer has said this before, and I have argued against it before, back when this site was just part of a blog. This site is about rationality, not physics; and the quantum case is not essential to the exposition of this fallacy. But given the regularity with which many-worlds metaphysics shows up in discussion here, perhaps it is worth presenting a case for the opposition.
We can do this the easy way, or the hard way. The easy way is to argue that many-worlds is merely not favored, because we are nowhere near being able to locate our hypotheses in a way which permits a clean-cut judgment about their relative merits. The available hypotheses about the reality beneath quantum appearances are one and all unfinished muddles, and we should let their advocates get on with turning them into exact hypotheses without picking favorites first. (That is, if their advocates can be bothered turning them into exact hypotheses.)
The hard way is to argue that many-worlds is actually disfavored - that we can already say it is unlikely to be true. But let's take the easy path first, and see how things stand at the end.
The two examples of favoring an arbitrary hypothesis with which we have been provided - the murder investigation, the rivalry of religions - both present a situation in which the obvious hypotheses are homogeneous. They all have the form "Citizen X did it" or "Deity Y did it". It is easy to see that for particular values of X and Y, one is making an arbitrary selection from a large set of possibilities. This is not the case in quantum foundations. The well-known interpretations are extremely heterogeneous. There has not been much of an effort made to express them in a common framework - something necessary if we want to apply Occam's razor in the form of theoretical complexity - nor has there been much of an attempt to discern the full "space" of possible theories from which they have been drawn - something necessary if we really do wish to avoid privileging the hypotheses we happen to have. Part of the reason is, again, that many of the known options are somewhat underdeveloped as exact theories. They subsist partly on rhetoric and handwaving; they are mathematical vaporware. And it's hard to benchmark vaporware.
In his latest article, Eliezer presents the following argument:
"... there [is] no concrete evidence whatsoever that favors a collapse postulate or single-world quantum mechanics. But, said Scott, we might encounter future evidence in favor of single-world quantum mechanics, and many-worlds still has the open question of the Born probabilities... There must be a trillion better ways to answer the Born question without adding a collapse postulate..."
The basic wrong assumption being made is that quantum superposition by default equals multiplicity - that because the wavefunction in the double-slit experiment has two branches, one for each slit, there must be two of something there - and that a single-world interpretation has to add an extra postulate to this picture, such as a collapse process which removes one branch. But superposition-as-multiplicity really is just another hypothesis. When you use ordinary probabilities, you are not rationally obligated to believe that every outcome exists somewhere; and an electron wavefunction really may be describing a single object in a single state, rather than a multiplicity of them.
A quantum amplitude, being a complex number, is not an ordinary probability; it is, instead, a mysterious quantity from which usable probabilities are derived. Many-worlds says, "Let's view these amplitudes as realities, and try to derive the probabilities from them." But you can go the other way, and say, "Let's view these amplitudes as derived from the probabilities of a more fundamental theory." Mathematical results like Bell's theorem show that this will require a little imagination - you won't be able to derive quantum mechanics as an approximation to a 19th-century type of physics. But we have the imagination; we just need to use it in a disciplined way.
So that's the kernel of the argument that many worlds is not favored: the hypotheses under consideration are still too much of a mess to even be commensurable, and the informal argument for many worlds, quoted above, simply presupposes a multiplicity interpretation of quantum superposition. How about the argument that many worlds is actually disfavored? That would become a genuinely technical discussion, and when pressed, I would ultimately not insist upon it. We don't know enough about the theory-space yet. Single-world thinking looks more fruitful to me, when it comes to sub-quantum theory-building, but there are versions of many-worlds which I do occasionally like to think about. So the verdict for now has to be: not proven; and meanwhile, let a hundred schools of thought contend.
If mere clarity were the issue, then Bohmian mechanics would be #1, spontaneous collapse theories would be #2, and many-worlds and the "zigzag in time" approach would be tied for third place.
The reason for this ranking is that Bohmian mechanics and collapse theories actually have equations of motion which allow you to make the correct predictions. But the collapse theories come off as slightly inferior because there is no principle constraining the form of collapse dynamics.
Zigzag-in-time refers to John Cramer's transactional interpretation and Mark Hadley's QM-from-gravity approach (mentioned above). They're in third place with many-worlds because they cannot presently make predictions.
But the situation is way more complex than this summary suggests. You can have Bohmian mechanics without a pilot wave (the "nomological" version of Bohm), you can have a collapse theory without superpositions (you just quantum jump from one "collapse" to the next), you can have many-worlds without a universal wavefunction (just use the world-probabilities in a "consistent histories" ensemble). Like I said, the known options have been expressed in a babel of theoretical frameworks, and anything resembling objective comparison has hardly begun. The human race is still thinking this through.
Thanks. I'd really like to see a post explaining the different interpretations in detail.