Right, over an infinite series of bets the probability that Kelly goes ahead of a different fixed allocation goes to 1. Some caveats:
In the long run, we’re all dead: in decisions like retirement fund investments the game is short enough that Kelly takes too much risk of short-term losses and you should bet less than Kelly
Kelly doesn’t maximize expected winnings: each bet where you bet more than Kelly multiplies your EV (relative to Kelly) in exchange for a chance of falling behind Kelly
A strategy that is “bet Kelly over the infinite series of bets, except for n all-in bets to get q times Kelly EV in exchange for probability p of losing it all” may not be “essentially different” but it’s noteworthy and calls for betting more than Kelly in some bets
In an odd situation where your utility is linear or super-linear in winnings, the utility-maximizing strategy is 100% all-in bets essentially different strategy in the long run
In the long run, we’re all dead: in decisions like retirement fund investments the game is short enough that Kelly takes too much risk of short-term losses and you should bet less than Kelly
Which is one of the justifications for pension funds and annuities: by having a much longer timespan than any one retiree, they can make larger Kelly bets, see larger returns on investment, with benefits to either the retirees they are paying or the larger economy. Hanson says that this implies that eventually the economy will be dominated by Kelly players.
“the utility-maximizing strategy is 100% all-in bets”
Not quite. It’s going all-in when the expected value is greater than one, and not betting anything when it’s less. If you have a 51% chance doubling your money, go all in. If you have a 49% chance, don’t bet anything. In fact, bet negative if that’s allowed.
Right, over an infinite series of bets the probability that Kelly goes ahead of a different fixed allocation goes to 1. Some caveats:
In the long run, we’re all dead: in decisions like retirement fund investments the game is short enough that Kelly takes too much risk of short-term losses and you should bet less than Kelly
Kelly doesn’t maximize expected winnings: each bet where you bet more than Kelly multiplies your EV (relative to Kelly) in exchange for a chance of falling behind Kelly
A strategy that is “bet Kelly over the infinite series of bets, except for n all-in bets to get q times Kelly EV in exchange for probability p of losing it all” may not be “essentially different” but it’s noteworthy and calls for betting more than Kelly in some bets
In an odd situation where your utility is linear or super-linear in winnings, the utility-maximizing strategy is 100% all-in bets essentially different strategy in the long run
Which is one of the justifications for pension funds and annuities: by having a much longer timespan than any one retiree, they can make larger Kelly bets, see larger returns on investment, with benefits to either the retirees they are paying or the larger economy. Hanson says that this implies that eventually the economy will be dominated by Kelly players.
“the utility-maximizing strategy is 100% all-in bets”
Not quite. It’s going all-in when the expected value is greater than one, and not betting anything when it’s less. If you have a 51% chance doubling your money, go all in. If you have a 49% chance, don’t bet anything. In fact, bet negative if that’s allowed.
Right, and Kelly allocation is 0 for negative EV bets.
Carl, thanks, this is great!