Robust Utility Maximization with Drift and Volatility Uncertainty

Abstract

We give explicit solutions for utility maximization of terminal wealth problem u(XT) in the presence of Knightian uncertainty in continuous time [0,T] in a complete market. We assume there is uncertainty on both drift and volatility of the underlying stocks, which induce nonequivalent measures on canonical space of continuous paths . We take that the uncertainty set resides in compact sets that are time dependent. In this framework, we solve the robust optimization problem with logarithmic, power and exponential utility functions, explicitly.