Given that they are presented at the same time (such as X is a conjecture, Y is a proof of the conjecture), yes, accepting these bets is being Dutch Booked. But upon seeing “X and Y” you would update “X” to something like 95%.
Given that they are presented in order (What bet do you take against X? Now that’s locked in, here is a proof Y. What bet do you take for “X and Y”?) this is a malady that all reasoners without complete information suffer from. I am not sure if that counts as a Dutch Book.
Given that they are presented in order [...] I am not sure if that counts as a Dutch Book.
It is trivial to reformulate this problem to X and X’ being logically equivalent, but not immediately noticeable as such, and a person being asked about X’ and (X and Y) or something like that.
Yes, but that sounds like “If you don’t take the time to check your logical equivalencies, you will take Dutch Books”. This is that same malady: it’s called being wrong. That is not a case of Bayesianism being open to Dutch Books: it is a case of wrong people being open to Dutch Books.
“If you don’t take the time to check your logical equivalencies, you will take Dutch Books”
You’re very wrong here.
By Goedel’s Incompleteness Theorem, there is no way to “take the time to check your logical equivalencies”. There are always things that are logically equivalent that your particular method of proving, no matter how sophisticated, will not find, in any amount of time.
This is somewhat specific to Bayesianism, as Bayesianism insists that you always give a definite numerical answer.
Not being able to refuse answering (by Bayesianism) + no guarantee of self-consistency (by Incompleteness) ⇒ Dutch booking
I admit defeat. When I am presented with enough unrefusable bets that incompleteness prevents me from realising are actually Dutch Books such that my utility falls consistently below some other method, I will swap to that method.
That’s not the Dutch book I was talking about.
Let’s say you assign “X” probability of 50%, so you gladly take 60% bet against “X”.
But you assign “X and Y” probability 90%, so you as gladly take 80% bet for “X and Y”.
You just paid $1.20 for combinations of bets that can give you returns of at most $1 (or $0 if X turns out to be true but Y turns out to be false).
This is exactly a Dutch Book.
Given that they are presented at the same time (such as X is a conjecture, Y is a proof of the conjecture), yes, accepting these bets is being Dutch Booked. But upon seeing “X and Y” you would update “X” to something like 95%.
Given that they are presented in order (What bet do you take against X? Now that’s locked in, here is a proof Y. What bet do you take for “X and Y”?) this is a malady that all reasoners without complete information suffer from. I am not sure if that counts as a Dutch Book.
It is trivial to reformulate this problem to X and X’ being logically equivalent, but not immediately noticeable as such, and a person being asked about X’ and (X and Y) or something like that.
Yes, but that sounds like “If you don’t take the time to check your logical equivalencies, you will take Dutch Books”. This is that same malady: it’s called being wrong. That is not a case of Bayesianism being open to Dutch Books: it is a case of wrong people being open to Dutch Books.
You’re very wrong here.
By Goedel’s Incompleteness Theorem, there is no way to “take the time to check your logical equivalencies”. There are always things that are logically equivalent that your particular method of proving, no matter how sophisticated, will not find, in any amount of time.
This is somewhat specific to Bayesianism, as Bayesianism insists that you always give a definite numerical answer.
Not being able to refuse answering (by Bayesianism) + no guarantee of self-consistency (by Incompleteness) ⇒ Dutch booking
I admit defeat. When I am presented with enough unrefusable bets that incompleteness prevents me from realising are actually Dutch Books such that my utility falls consistently below some other method, I will swap to that method.