The example you give has a pretty simple lattice of preferences, which lends itself to illustrations but which might create some misconceptions about how the subagent model should be formalized. For example, in your example you assume that the agents’ preferences are orthogonal (one cares about pepperoni, the other about mushrooms, and each is indifferent to the opposite direction), the agents have equal weighting in the decision-making, the lattice is distributive… Compensating for these factors, there are many ways that a given ‘weak utility’ can be expressed in terms of subagents. I’m sure there are optimization questions that follow here, about the minimum number of subagents (dimensions) needed to embed a given weak-utility function (partially ordered set), and about when reasonable constraints such as orthogonality of subagents can be imposed. There are also composition questions: how does a committee of agents with subagents behave?
The example you give has a pretty simple lattice of preferences, which lends itself to illustrations but which might create some misconceptions about how the subagent model should be formalized. For example, in your example you assume that the agents’ preferences are orthogonal (one cares about pepperoni, the other about mushrooms, and each is indifferent to the opposite direction), the agents have equal weighting in the decision-making, the lattice is distributive… Compensating for these factors, there are many ways that a given ‘weak utility’ can be expressed in terms of subagents. I’m sure there are optimization questions that follow here, about the minimum number of subagents (dimensions) needed to embed a given weak-utility function (partially ordered set), and about when reasonable constraints such as orthogonality of subagents can be imposed. There are also composition questions: how does a committee of agents with subagents behave?