Recovering Probability Distributions from Option Prices

Authors

  • JENS CARSTEN JACKWERTH,

  • MARK RUBINSTEIN

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    • Jens Carsten Jackwerth is a postdoctoral visiting scholar and Mark Rubinstein is a professor of finance, both at the Haas School of Business, University of California at Berkeley. For helpful discussions, we thank Ron Lagnado, Hayne Leland, Dennis Klapacz, Steve Manaster, Stewart Mayhew, William Redfearn, and Robert Whaley.


ABSTRACT

This article derives underlying asset risk-neutral probability distributions of European options on the S&P 500 index. Nonparametric methods are used to choose probabilities that minimize an objective function subject to requiring that the probabilities are consistent with observed option and underlying asset prices. Alternative optimization specifications produce approximately the same implied distributions. A new and fast optimization technique for estimating probability distributions based on maximizing the smoothness of the resulting distribution is proposed. Since the crash, the risk-neutral probability of a three (four) standard deviation decline in the index (about −36 percent (−46 percent) over a year) is about 10 (100) times more likely than under the assumption of lognormality.

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