Theoretical Economics, Vol. 12, Issue. 1, p. 109-139
Péter Eső, Balázs Szentes
This paper generalizes a conceptual insight in dynamic contracting with quasilinear payoffs: the principal does not need to pay any information rents for extracting the agent's `new' private information obtained after signing the contract. This is shown in a general model in which the agent's type stochastically evolves over time, and her payoff (which is linear in transfers) depends on the entire history of private and any contractible information, contractible decisions and her hidden actions. The contract is offered by the principal in the presence of initial informational asymmetry. The model can be transformed into an equivalent one where the agent's subsequent information is independent in each period (type orthogonalization). We show that for any fixed decision-action rule implemented by a mechanism, the agent's rents (as well as the principal's maximal revenue) are the same as if the principal could observe and contract on the agent's orthogonalised types after the initial period. We also show that any monotonic decision-action rule can be implemented in a Markovian environment satisfying certain regularity conditions, and provide a simple `recipe' for solving such dynamic contracting problems.