Some have expressed skepticism that “unlosing agents” can actually exist. So to provide an existence proof, here is a model of an unlosing agent. It’s not a model you’d want to use constructively to build one, but it’s sufficient for the existence result.
Let D be the set of all decisions the agent has made in the past, let U be the set of all utility functions that are compatible with those decisions, and let P be a “better than” relationship on the set of outcomes (possibly intransitive, dependent, incomplete, etc...).
By “utility functions that are compatible those decisions” I mean that an expected utility maximising agent with any u in U would reach the same decisions D as the agent actually did. Notice that U starts off infinitely large when D is empty; when the agent faces a new decision d, here is a decision criteria that leaves U non-empty:
Restrict to the set of possible decision choices that would leave U non-empty. This is always possible, as any u in U would advocate for a particular decision choices du at d, and therefore choosing du would leave u in the updated U. Call this set compatible.
Among those compatible choices, choose one that is the least incompatible with P, using some criteria (such as needing to do the least work to remove intransitivenesses and dependences and so on).
Make that choice, and update P as in step 3, and update D and U (leaving U non-empty, as seen in step 1).
Proceed.
That’s the theory. In practice, we would want to restrict the utilities initially allowed into U to avoid really stupid utilities (“I like losing money to people called Rob at 15:46.34 every alternate Wednesday if the stock market is up; otherwise I don’t.”) When constructing the initial P and U, it could be a good start to be just looking at categories that humans natuarally express preferences between. But those are implementation details. And again, using this kind of explicit design violates the spirit of unlosing agents (unless the set U is defined in ways that are different from simply listing all u in U).
The proof that this agent is unlosing is that a) U will never be empty, and b) for any u in U, the agent will have behaved indistinguishably from a u-maximiser.
Model of unlosing agents
Some have expressed skepticism that “unlosing agents” can actually exist. So to provide an existence proof, here is a model of an unlosing agent. It’s not a model you’d want to use constructively to build one, but it’s sufficient for the existence result.
Let D be the set of all decisions the agent has made in the past, let U be the set of all utility functions that are compatible with those decisions, and let P be a “better than” relationship on the set of outcomes (possibly intransitive, dependent, incomplete, etc...).
By “utility functions that are compatible those decisions” I mean that an expected utility maximising agent with any u in U would reach the same decisions D as the agent actually did. Notice that U starts off infinitely large when D is empty; when the agent faces a new decision d, here is a decision criteria that leaves U non-empty:
Restrict to the set of possible decision choices that would leave U non-empty. This is always possible, as any u in U would advocate for a particular decision choices du at d, and therefore choosing du would leave u in the updated U. Call this set compatible.
Among those compatible choices, choose one that is the least incompatible with P, using some criteria (such as needing to do the least work to remove intransitivenesses and dependences and so on).
Make that choice, and update P as in step 3, and update D and U (leaving U non-empty, as seen in step 1).
Proceed.
That’s the theory. In practice, we would want to restrict the utilities initially allowed into U to avoid really stupid utilities (“I like losing money to people called Rob at 15:46.34 every alternate Wednesday if the stock market is up; otherwise I don’t.”) When constructing the initial P and U, it could be a good start to be just looking at categories that humans natuarally express preferences between. But those are implementation details. And again, using this kind of explicit design violates the spirit of unlosing agents (unless the set U is defined in ways that are different from simply listing all u in U).
The proof that this agent is unlosing is that a) U will never be empty, and b) for any u in U, the agent will have behaved indistinguishably from a u-maximiser.