The latest attempt at a decision-theoretic account of QM probabilities is David Wallace's, here: http://arxiv.org/PS_cache/arxiv/pdf/0906/0906.2718v1.pdf . I mention this because this proof is not susceptible to the criticisms that Barnum et al. raise against Deutsch's proof.
If we're going to be talking about the approach, it's worth getting some sense of the argument. Below, I've reproduced a very non-technical summary. I describe the decision problem, the assumptions (which Wallace thinks are intuitive constraints on rational decision-making, although I'm not sure I agree), and the representation theorem itself. It is a remarkable result. The assumptions seem fairly weak but the theorem is striking. To get the gist of the theorem, scroll down to the bolded part. If it seems that it couldn't possibly be true, look at the assumptions and think about which one you want to reject, because the theorem does follow from (appropriately formalized versions of) these assumptions.
The Decision Problem
The agent is choosing between different preparation-measurement-payment (or p-m-p) sequences (Wallace calls them acts, but this terminology is counter-intuitive, so I avoid it). In each sequence...
The worst thing about the Many Worlds Interpretation: The name. I mean, wtf? Everett used the perfectly sensible name "Theory of the Universal Wavefunction" which wikipedia at least acknowledges as another name for it. And 'Many Worlds' barely makes sense. It's more "It's not just one world - it's like... completely different to how we used to consider the world and to the extent there is a 'world' at all there are a bunch of them".
Here are some additional sources criticizing the decision-theoretic approach by Deutsch and Wallace:
Decisions, Decisions, Decisions: Can Savage Salvage Everettian Probability? Huw Price's critique.
Probability in the Everett World: Comments on Wallace and Greaves Huw Price again
Decision Theory is a Red Herring for the Many Worlds Interpretation Jacques Mallah's thorough rebuttal of the approach by Wallace et al.
Everett and the Born Rule Alastair Rae's rebuttal.
One world versus many: the inadequacy of Everettian accounts of evolution, probability, and scient...
I think that EY has played a cruel joke (or maybe it was a rationality test for the readers), where he misrepresented an active area of physics research as an open-and-shut case of the MWI being the One True Teaching. (The alternative is an unthinkable weirdtopia: EY failed at rationality?!?!)
Were it not for the Quantum Physics sequence, the LWers would not bring the issue up as often, given the many many other active areas of (Physics) research that are just as deceptively simple to an uninitiated.
Consider, for example, an alternate universe where the gr...
Wait, what? This hasn't been derived yet for non-relativistic QM, and these guys claim to have done it through decision theory, not, say, probability?
Man, my calibration is way off on this.
Someone asked me to join the discussion, so here goes:
I don't buy the decision-theory thing. I don't think I can make a quantum coinflip come out a different way by redefining my utility function. So no, this ain't my MWI.
I don't buy the decision-theory thing. I don't think I can make a quantum coinflip come out a different way by redefining my utility function.
The Oxford Everettians don't think so either. I mean, come on, Deutsch and Wallace are pretty smart people. Let's give them a little bit of credit. If your construal of their view is just blatantly absurd, the problem is probably with your construal, not their view. I tried to give some sense of Wallace's position in these comments.
The point of Wallace's argument is that no matter what your preference ordering over rewards (assuming they obey certain intuitive constraints), you will recover the Born probabilities.
I find it rather interesting that Yudowsky does not participate in debates that challenge his view like this...
I think that the fuzziness of the worlds is much more popular both on LW and among physicists than the decision-theoretic derivation of the Born rule. For example, the decoherence literature is about fuzzy worlds. I don't think it is helpful to talk about the two together.
I'll copy my comment from the other thread:
That is, if a quantum world is something whose existence is fuzzy and which doesn't even have a definite multiplicity - that is, we can't even say if there's one, two, or many of them - if those are the properties of a quantum world, then is it possible for the real world to be one of those?
The real world is a single point in configuration space (there are uncountably many such points). So what's the point of keeping track of the blobs? It's because the Hilbert space is so vast that it's very unlikely that tw...
To clarify: does the Deutsch-Wallace school hold that worlds/branches are like real numbers, in that if you pick any two worlds, you can always pick a world that lies "between" them? Or is it some confused alternative?
This seems to be one of the main Deutsch papers on the topic: Quantum Theory of Probability and Decisions.
Deutsch sets out to demonstrate that "No probabilistic axiom is required in quantum theory." - which seems to be reasonable enough.
I would very much appreciate critical feedback on this comment, as I have no math background.
First, there is no definite number of "worlds" or "branches". They have a fuzzy, vague, approximate, definition-dependent existence.
Some stuff can no longer influence other stuff due to distance and the locality of physics, whereas in the past it could. As time goes on, this is true of more and more things. For each bit of stuff and each other bit, the question of whether they are or are not in range has a definite answer, whether we know it...
The question here is which is the correct / best interpretation of quantum mechanics.
The key word in this is interpretation. The actual predictions of what we should actually observe are the same for all the various interpretations of quantum mechanics - this should be no surprise, because we are not discussing the actual mathematics of quantum mechanics, nor its predictions.
We are in fact discussing the unobservable aspects of quantum mechanics. If I perceive a random quantum event, is there also a counterpart of me that perceives the other outcome of tha...
Sorry. I edited my post to make it clearer before I saw yours, so the part you quoted has now disappeared. Anyway, I'm not entirely on board with the Deutsch-Wallace program, so I'm not going to offer a full defense of their view. I do want to make sure it's clear what they claim to be doing.
Consider a simpler case then the two-slit experiment: a Stern-Gerlach experiment on spin-1/2 particles prepared in the superposition sqrt(1/4) |up> + sqrt(3/4) |down>. Ignoring fuzzy world complications for now, the Everettian says that upon measurement of the particle, my branch will split into two branches. In one branch, a future self will observe spin-up, and in the other branch a future self will observe spin-down. All of this is determined by the Schrodinger dynamics. The Born probabilities don't enter into it.
Where the Born probabilities enter is in how I should behave pre-split. As an Everettian, I am not in a genuine state of subjective uncertainty about what will happen, but I am in the weird position of knowing that I'm going to be splitting. According to Wallace (and I'm not sure I agree with this), the appropriate way to behave in this circumstance is not as if I'm going to turn into two separate people. It is basically psychologically impossible for a human being to have this attitude. Instead, I should behave as if I am subjectively uncertain about which of the two future selves is going to be me. Perhaps on some intellectual level I know that both of them will be me, but we have not evolved to account for such fission in our decision-making processes, so I have to treat it as a case where I am going to end up as just one of them, but I don't know which one.
Adopting this position of faux subjective uncertainty, I should plan for the future as if maximizing expected utility. And if I am organizing my beliefs this way, the decision theoretic argument establishes that I should set my probabilities in accord with the Born rule. In this case, the probabilities do not stem from genuine uncertainty, and they do not represent frequencies. So the fact that I expect to see spin-down does not mean that spin-down is more likely to happen in any ordinary sense. It means that as a rational agent, I should behave as if I am more likely to head down the spin-down branch.
The problematic step here is the one where decision-making in a branching world is posited to have the same rational structure as decision-making in a situation of uncertainty, even though there is no genuine uncertainty. There are a number of arguments for and against this proposition that we can go into if you like. For now, suffice it to say that I remain unconvinced that this is the right way to make decisions when faced with fission, but I don't think the idea is completely insane. Wallace's thoughts on this question are here: http://philsci-archive.pitt.edu/3811/1/websites.pdf
There is still the problem that if all histories exist and if they exist equally, then the majority of them will look nothing like the real world, the shape of which depends upon some things happening more often than others. Regardless of the validity of this reasoning about "decision-making in a branch world", the characteristic experience of an agent in this sort of multiverse (where all possible histories exist equally) will be of randomness. If we think at the basic material level, agents shouldn't even exist in most branches; atoms will just...
The subject has already been raised in this thread, but in a clumsy fashion. So here is a fresh new thread, where we can discuss, calmly and objectively, the pros and cons of the "Oxford" version of the Many Worlds interpretation of quantum mechanics.
This version of MWI is distinguished by two propositions. First, there is no definite number of "worlds" or "branches". They have a fuzzy, vague, approximate, definition-dependent existence. Second, the probability law of quantum mechanics (the Born rule) is to be obtained, not by counting the frequencies of events in the multiverse, but by an analysis of rational behavior in the multiverse. Normally, a prescription for rational behavior is obtained by maximizing expected utility, a quantity which is calculated by averaging "probability x utility" for each possible outcome of an action. In the Oxford school's "decision-theoretic" derivation of the Born rule, we somehow start with a ranking of actions that is deemed rational, then we "divide out" by the utilities, and obtain probabilities that were implicit in the original ranking.
I reject the two propositions. "Worlds" or "branches" can't be vague if they are to correspond to observed reality, because vagueness results from an object being dependent on observer definition, and the local portion of reality does not owe its existence to how we define anything; and the upside-down decision-theoretic derivation, if it ever works, must implicitly smuggle in the premises of probability theory in order to obtain its original rationality ranking.
Some references:
"Decoherence and Ontology: or, How I Learned to Stop Worrying and Love FAPP" by David Wallace. In this paper, Wallace says, for example, that the question "how many branches are there?" "does not... make sense", that the question "how many branches are there in which it is sunny?" is "a question which has no answer", "it is a non-question to ask how many [worlds]", etc.
"Quantum Probability from Decision Theory?" by Barnum et al. This is a rebuttal of the original argument (due to David Deutsch) that the Born rule can be justified by an analysis of multiverse rationality.