I think it does do the double decrease for the known smaller network.
Take three agent A1, A2, and A3, with utilities u1, u2, and u3. Assume the indexes i, j, and k are always distinct.
For each Ai, they can boost uj at the cost described above in terms of ui.
What I haven’t really specified is the three-way synergy—can Ai boost uj+uk more efficiently that simply boosting uj and uk independently? In general yes (the two utilities uj and uk are synergistic with each other, after all), but let’s first assume there is zero three-way synergy.
Then each agent Ai will sacrifice 1/2+1/2=1 in ui to boost uj and uk each by 1. Overall, each utility function goes up by 1+1−1=1. This scales linearly with the size of the trade network each agent sees (excluding themselves): if there were two agents total, each utility would go up by 1/2, as in the top post example. And if there were n+1 agents, each utility would go up by n/2.
However, if there are any three-way, four-way,..., or n-way synergies, then the trade network is more efficient than that. So there is a double decrease (or double increase, from the other perspective), as long as there are higher-order synergies between the utilities.
I think the double decrease effect kicks in with uncertainty, but not with confident expectation of a smaller network.
I think it does do the double decrease for the known smaller network.
Take three agent A1, A2, and A3, with utilities u1, u2, and u3. Assume the indexes i, j, and k are always distinct.
For each Ai, they can boost uj at the cost described above in terms of ui.
What I haven’t really specified is the three-way synergy—can Ai boost uj+uk more efficiently that simply boosting uj and uk independently? In general yes (the two utilities uj and uk are synergistic with each other, after all), but let’s first assume there is zero three-way synergy.
Then each agent Ai will sacrifice 1/2+1/2=1 in ui to boost uj and uk each by 1. Overall, each utility function goes up by 1+1−1=1. This scales linearly with the size of the trade network each agent sees (excluding themselves): if there were two agents total, each utility would go up by 1/2, as in the top post example. And if there were n+1 agents, each utility would go up by n/2.
However, if there are any three-way, four-way,..., or n-way synergies, then the trade network is more efficient than that. So there is a double decrease (or double increase, from the other perspective), as long as there are higher-order synergies between the utilities.