I find the article very interesting, but have trouble following the math. Maybe someone here better at math can help. I do have some understanding of linear algebra, and I've tried to check it with a spreadsheet:
I don't know how to convert that into a V with no negative numbers. Some of the co-efficients are positive and some negative, so you can't just scale it. Their formula for s_y correctly returns 2, but it's unclear if that corresponds to a real world equilibrium.
Are these fatal problems? Not sure yet. Their overall conclusion meets with my intuition. They're just saying that if one player only tries to maximize his own score, while the other player is strategic (in terms of denying the first player a higher score), then the second player is going to win in the long term. Except they call the first player "evolutionary," and the second player "sentient."
And two, there's no point being too "smart" (looking back too many moves) when your opponent is "dumb" (looking back only 1 move).
You could say both of these things about the current bargaining position of the US political parties right now.
v cannot have negative entries. It appears that are you are forgetting the signs in the formula for the adjugate.
v is guaranteed to exist and be a valid probability vector as long as M is an irreducible Markov matrix (that is, any state can eventually be reached from any other state). An equivalent and intuitively easier way to calculate v is by repeatedly squaring M: when you do this, all rows of M^k converge to v. This is a consequence of the fact that v is an equilibrium state, i.e., the probability distribution you end up with if you let the Markov ...
Bill "Numerical Recipes" Press and Freeman "Dyson sphere" Dyson have a new paper on iterated prisoner dilemas (IPD). Interestingly they found new surprising results:
They discuss a special class of strategies - zero determinant (ZD) strategies of which tit-for-tat (TFT) is a special case:
The evolutionary player adjusts his strategy to maximize score, but doesn't take his opponent explicitly into account in another way (hence has "no theory of mind" of the opponent). Possible outcomes are:
A)
B)
This latter case sounds like a formalization of Hosfstadter's superrational agents. The cooperation enforcement via cross-setting the scores is very interesting.
Is this connection true or am I misinterpreting it? (This is not my field and I've only skimmed the paper up to now.) What are the implications for FAI? If we'd get into an IPD situation with an agent for which we simply can not put together a theory of mind, do we have to live with extortion? What would effectively mean to have a useful theory of mind in this case?
The paper ends in a grand style (spoiler alert):