Optimal Contracting under Mean-Volatility Ambiguity Uncertainties
Posted: 2 May 2015 Last revised: 14 May 2021
Date Written: February 19, 2020
Abstract
We present a continuous-time agency model under mean-volatility joint ambiguity uncertainties, where both the principal and agent exhibit Gilboa-Schmeidler's extreme ambiguity aversion. For this, we extend the martingale method well known in the agency literature, by allowing not only the mean but the volatility of the outcome process to be controlled in weak formulation. Unlike the existing literature, we distinguish between ex-post realized and ex-ante perceived volatilities. Then we argue that the second-best contract in general consists of two sharing rules: one for realized outcome and the other for realized volatility. The outcome sharing rule is for uncertainty sharing and work incentives, as usual, and the volatility sharing rule complements the other rule by aligning the agent's worst prior with that of the principal. The optimal volatility sharing occurs when the worst priors of the two contracting parties become symmetrized. As a result, the realized compensation is positively associated with the realized volatility.
Keywords: mean-volatility ambiguity, moral hazard, optimal contract, stock option, managerial compensation, volatility control, weak formulation
JEL Classification: C61, C73, D81, D86, G34
Suggested Citation: Suggested Citation