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Optimal Liquidation Of Derivative Portfolios

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Mathematical Finance

Published online on

Abstract

We consider the problem facing a risk‐averse agent who seeks to liquidate or exercise a portfolio of (infinitely divisible) perpetual American‐style options on a single underlying asset. The optimal liquidation strategy is of threshold form and can be characterized explicitly as the solution of a calculus of variations problem. Apart from a possible initial exercise of a tranche of options, the optimal behavior involves liquidating the portfolio in infinitesimal amounts, but at times which are singular with respect to calendar time. We consider a number of illustrative examples involving CRRA and CARA utility, stocks, and portfolios of options with different strikes, and a model where the act of exercising has an impact on the underlying asset price.