Abstract
This paper studies the efficient allocation of capital and consumption in a production economy with many agents, private information, and aggregate risk. It extends the influential work of Andrew Atkeson and Robert E. Lucas Jr. (1992), who analyzed a related problem in an exchange economy. In a dynamic production setting, the planner faces a fundamental trade-off between providing some insurance against privately observed idiosyncratic risk and sustaining productive investment and economic growth. Using mean-field control techniques, we derive the infinite dimensional Hamilton–Jacobi–Bellman equation that characterizes constrained-efficient allocations. Under constant relative risk aversion preferences, the solution admits a simple characterization. We show that constrained-efficient allocations can be decentralized through a competitive market in which goods trade against a single safe asset supplied by fiscal or monetary authorities. Dynamic efficiency requires setting the growth rate of the safe asset to balance the demand of agents for insurance with the investment needed to maintain optimal growth.
Keywords
Economies with private information; Mean Field Control; Monetary Policy;
Reference
Bruno Biais, Hans Gersbach, Jean-Charles Rochet, and Stéphane Villeneuve, “Dynamic Efficiency With Private Information”, TSE Working Paper, n. 26-1724, March 2026.
See also
Published in
TSE Working Paper, n. 26-1724, March 2026