1 Though they are somewhat beside the object of this paper, I interject here comments on Bach’s purported ‘$1,000,000 solution,’ which ‘solution,’ we may note, is said to be specifically for Newcomb Problems in which the predictor ‘makes his predictions by plugging [a] psychological profile [for the agent]...into a powerful psychological theory’ (413).

Bach’s ‘meta-argument for ONE’ (412) is for the conclusion that in any such problem there is not for BOTH, though there is for ONE, a ‘solution’ in sense of a ‘not merely irrefutable argument but an argument that works, one whose use is likely to pay off to the tune of at least $1M’ (412). By a ‘solution’ we can gather that Bach means an argument that is ‘good’ in a sense additional to the three I have distinguished, that is furthermore not a simple compound of these three. Being ‘seemingly irrefutable’ is not the same as being ‘good₁.’ And being an argument ‘whose use is likely to pay off to the tune of at least $1M,’ may be being an argument whose use on the occasion would yield evidence for such a pay-off, which is different from being either ‘good₂’ or good₃.’

In any case, however, and regardless of the exact details of Bach’s ‘solution-concept,’ there is a problem with his meta-argument. For though he presents reasons for the conclusion ‘that there is no good argument for BOTH’ (414), he does not present reasons for thinking that there is (in his sense) a ‘good’ argument for ONE. Even if all arguments for ONE ‘work’ in his sense (as he implies-‘on the assumption that PR anticipated you would use it, you can use any argument for ONE’ [424]), Bach gives no reason for the conclusion that there is even one argument (first-order, meta-, meta-meta-, or what have you) for ONE that is ‘seemingly irrefutable.’ He has in fact not addressed this issue, or done anything to counter even the extreme opposite view, held by most two boxers, even if rarely expressed, that every argument for ONE, once clarified and reduced to its fundamentals, will be found to contain some ‘obvious error’ or other (my emphasis: Corliss G. Swain, ‘Cutting a Gordian Knot: The Solution to Newcomb’s Problem,’ Philosophical Studies 53 [1988], 391). Bach has not taken seriously the possibility that there is no ‘solution’ in his sense to Newcomb’s Problem. Subject to uncertainty concerning his sense of ‘solution,’ that there is no ‘solution’ to Newcomb’s Problem is what all two-boxers believe.

2 Gauthier, David ‘Maximization Constrained: The Rationality of Cooperation,’ in Campbell, Richmond and Sowden, Lanning Paradoxes of Rationality and Cooperation: Prisoner’s Dilemma and Newcomb’s Problem (Vancouver: The University of British Columbia Press 1985), 89Google Scholar; and Gauthier, David Morals by Agreement (Oxford: Clarendon Press 1986), 183Google Scholar

3 ‘Budweiser’ is lifted from the following:

(Letters of E. B. White, Dorothy Lobrano Guth, ed. [New York: Harper & Row 1976], 537)

4 If there is implicit in Gauthier’s writings a ‘meta-argument’ for ONE in certain Newcomb Problems, it is a simpler argument than Bach’s (see note 1 above). If there is such an argument implicit in Gauthier’s writings, it is one that claims, quite without regard for conditions like that of ‘seeming irrefutability,’ that there is a one-box ‘rational solution,’ but not a two-box one-an argument that makes this claim solely on the ground that there is a one-box (first-order) argument that ‘works₃.’ Rationality, at the level of particular choices, is-or can at least seem to be-in Gauthier’s writings, ‘whatever works₃.’

I thank Paul Abela for questions that led to this paper, and Richmond Campbell for comments on its penultimate version. My paper ‘Infallible Predictors’ (Philosophical Review 97 [1988], 3-24) especially remarks in it on ideas of Terence Horgan’s, may be found relevant to parts of Bach’s paper on which I have not commented.