A sufficiently skeptical position is completely immune to criticism, or to any other form of argument. I don't see what anyone could hope to do about that, beyond not bothering arguing with people who profess such extreme skepticism.
(I am reminded of a little fable I think I saw in an old OB post. Human space travellers encounter an alien planet whose inhabitants have adopted an anti-inductive principle, with the unsurprising result that pretty much everything they do is miserably unsuccessful. The humans ask them "So why do you keep on doing this?" and they say "Well, it's never worked for us before...")
Are you familiar with Sextus Empiricus? If you like intransigent skepticism, you'll love him. And the SEP just published a new entry on him! While you are at it, you might want to look at this entry on a priori justification.
You are trying to answer Descartes' Evil Daemon argument. That is futile, because the whole point of the argument is to be unbeatable. But suppose you did come up with an argument against it; I can always come up with an even stronger "daemon" or whatnot that can defeat the argument. (There's always the classic "How d
This now has 90 comments, including 2 of my own. None of them are particularly enlightening, IMO, but this is still evidence that it's interesting or amusing. As such, I've retracted my downvote.
If the point is we can't derive the validity of probability from nothing, congratulations. You have rediscovered something significantly less useful than the wheel or fire.
So if you can't derive the validity of probability from nothing, what can you do?
1) Walk around in a self-induced fog of feigned ignorance, having slipped the fact that you have put logical derivation on a throne dictating "truth" without ever having questioned that operation. You certainly can't derive from nothing that logical derivation is the only source of truth.
2) Loo...
how are said axioms to be justified?
This is how I'd answer a sceptic:
If I put two apples into a bag that previously had two apples, I can take four apples out of the bag. Thus, I believe that axioms on which basic arithmetic is based are "justified". By the same token I believe axioms of probability and I'm pretty sure you see a close approximation of a "fair coin" on a daily basis, not to mention more complex behaviors which probability theory predicts very well. If after that you're still skeptic of the correlation, I expect you to...
Why should I take the skeptic seriously?
I cannot picture how I would live my life without coping with uncertainty. And I know that probability follows from various plausible axiomatizations of uncertainty. (E.g, Cox's theorem)
This makes me suspect strongly that the skeptic is playing terminological games, since there's no actual substantive thing I could do differently if they convinced me.
Belief in the axioms of probability theory is justified by the fact that someone with inconsistent beliefs can be Dutch-booked.
If you're willing to put money on your beliefs (i.e. bet on them), then you ought to believe in the axioms in the first place, otherwise your opponent will always be able to come up with a combination of bets that will cause you to lose money.
This fact was proved by Bruno de Finetti in 1930-ties. See e.g. AI: A Modern Approach for an easily approachable technical discussion.
how you answer a skeptic about ... reality
The standard answer is a punch in the nose. I have yet to meet a claimant to skepticism willing to let me perform this experiment enough times to get a trustworthy result.
Lighter-weight skeptics (those willing to at least tentatively accept some postulates about reality being real, and the validity of predicting future experiences) generally have no problem with "I can't justify these from first principles, but I'm using them until I can think of better".
"the question isn’t how to arrive at the Truth, but rather how to eliminate error. Which sounds kind of obvious, until I meet yet another person who rails to me about how empirical positivism can’t provide its own ultimate justification, and should therefore be replaced by the person’s favorite brand of cringe-inducing ugh." -- Scott Aaronson
I guess it's hard for me to understand what's irrational about advising them to eat the rice (as you indicated you would do). It seems like the only sane choice. I'm not sure exactly what you mean by "faith", but if advising people to eat the rice is based on it, then it must be compatible with rationality, right?
Right--choose the rice, assuming you (or they) want to live. That seems like the only sane choice, doesn't it?
Maybe this is a problem of terminology. You seem to be using the labels "faith" and "reason" in certain ways. Especially, you seem to be using the label "reason" to refer to the following of certain rules, but which you can't see how to justify.
Maybe instead of focusing on those rules (whatever they may happen to be), you should focus on why the rules are valuable in the first place (if they are). Presumably, it's because they reliably lead to success in achieving one's goals. The worth of the rules is contingent on their usefulness; it's not rational to believe only things you can prove with absolute certainty, because that would mean believing nothing, doing nothing, dying early and having no fun, and nobody wants that!
(In case you haven't read it, you might want to check you Newcomb's Problem and Regret of Rationality, from 2008.)
My conception of reason is based on determining what is true, completely and entirely irrespective of pragmatism. To call skeptical arguments irrational and call an anti-skeptical case rational would mean losing sight of the important fact that ONLY pragmatic considerations lead to the rejection of skepticism.
Rationality, to me, is defined as the hypothetical set of rules which reliably determine truth, not by coincidence, but because they must determine truth by their nature. Anything which does not follow said rules are irrational. Even if skepticism is...
I've raised arguments for philosophical scepticism before, which have mostly been argued against in a Popper-esque manner of arguing that even if we don't know anything with certainty, we can have legitimate knowledge on probabilities.
The problem with this, however, is how you answer a sceptic about the notion of probability having a correlation with reality. Probability depends upon axioms of probability- how are said axioms to be justified? It can't be by definition, or it has no correlation to reality.