1) Do paperclip maximizers care about paperclip mass, paperclip count, or both? More concretely, if you have a large, finite amount of metal, you can make it into N paperclips or N+1 smaller paperclips. If all that matters is paperclip mass, then it doesn't matter what size the paperclips are, as long as they can still hold paper. If all that matters is paperclip count, then, all else being equal, it seems better to prefer smaller paperclips.
2) It's not hard to understand how to maximize the number of paperclips in space, but how about in time? Once it's made, does it matter how long a paperclip continues to exist? Is it better to have one paperclip that lasts for 10,000 years and is then destroyed, or 10,000 paperclips that are all destroyed after 1 year? Do discount rates apply to paperclip maximization? In other words, is it better to make a paperclip now than it is to make it ten years from now?
3) Some paperclip maximizers claim want to maximize paperclip <i>production</i>. This is not the same as maximizing paperclip count. Given a fixed amount of metal, a paperclip count maximizer would make the maximum number of paperclips possible, and then stop. A paperclip production maximizer that didn't care about paperclip count would find it useful to recycle existing paperclips, melting them down so that new ones could be made. Which approach is better?
4) More generally, are there any conditions under which the paperclip-maximizing thing to do involves destroying existing paperclips? It's easy to imagine scenarios in which destroying some paperclips causes there to be more paperclips in the future. (For example, one could melt down existing paperclips and use the metal to make smaller ones.)
Thanks for your comment! First I was like, "Clippy wouldn't formalize humans as having utility functions", then I was like "in that case why do we want to formalize our utility functions?", and then I was all "because we have moral intuitions saying we should follow utility functions!" It's funny how the whole house of cards comes tumbling down.
(Why? Because it's fun.)
1) Do paperclip maximizers care about paperclip mass, paperclip count, or both? More concretely, if you have a large, finite amount of metal, you can make it into N paperclips or N+1 smaller paperclips. If all that matters is paperclip mass, then it doesn't matter what size the paperclips are, as long as they can still hold paper. If all that matters is paperclip count, then, all else being equal, it seems better to prefer smaller paperclips.
2) It's not hard to understand how to maximize the number of paperclips in space, but how about in time? Once it's made, does it matter how long a paperclip continues to exist? Is it better to have one paperclip that lasts for 10,000 years and is then destroyed, or 10,000 paperclips that are all destroyed after 1 year? Do discount rates apply to paperclip maximization? In other words, is it better to make a paperclip now than it is to make it ten years from now?
3) Some paperclip maximizers claim want to maximize paperclip <i>production</i>. This is not the same as maximizing paperclip count. Given a fixed amount of metal, a paperclip count maximizer would make the maximum number of paperclips possible, and then stop. A paperclip production maximizer that didn't care about paperclip count would find it useful to recycle existing paperclips, melting them down so that new ones could be made. Which approach is better?
4) More generally, are there any conditions under which the paperclip-maximizing thing to do involves destroying existing paperclips? It's easy to imagine scenarios in which destroying some paperclips causes there to be more paperclips in the future. (For example, one could melt down existing paperclips and use the metal to make smaller ones.)