Abstract
A riskâaverse agent hedges her exposure to a nontradable risk factor U using a correlated traded asset S and accounts for the impact of her trades on both factors. The effect of the agent's trades on U is referred to as crossâimpact. By solving the agent's stochastic control problem, we obtain a closedâform expression for the optimal strategy when the agent holds a linear position in U. When the exposure to the nontradable risk factor is nonlinear, we provide an approximation to the optimal strategy in closedâform, and prove that the value function is correctly approximated by this strategy when crossâimpact and riskâaversion are small. We further prove that when is nonlinear, the approximate optimal strategy can be written in terms of the optimal strategy for a linear exposure with the size of the position changing dynamically according to the exposure's âDeltaâ under a particular probability measure.