Article

Optimal insurance design of ambiguous risks

Christian Gollier

Abstract

We examine the characteristics of the optimal insurance contract under linear transaction cost and an ambiguous distribution of losses. Under the standard expected utility model, we know from Arrow (1965) that it contains a straight deductible. In this paper, we assume that the policyholder is ambiguity-averse in the sense of Klibanoff, Marinacci and Mukerji (2005). The optimal contract depends upon the structure of the ambiguity. For example, if the set of possible priors can be ranked according to the monotone likelihood ratio order, the optimal contract contains a disappearing deductible. We also show that the policyholder’s ambiguity aversion can reduce the optimal insurance coverage.

JEL codes

  • D81: Criteria for Decision-Making under Risk and Uncertainty
  • G22: Insurance • Insurance Companies • Actuarial Studies

Replaces

Christian Gollier, Optimal insurance design of ambiguous risks, IDEI Working Paper, n. 718, May 2012, revised January 2013.

Christian Gollier, Optimal insurance design of ambiguous risks, TSE Working Paper, n. 12-303, May 2012, revised January 2013.

Reference

Christian Gollier, Optimal insurance design of ambiguous risks, Economic Theory, Springer Berlin / Heidelberg, vol. 57, n. 3, November 2014, pp. 555–576.

Published in

Economic Theory, Springer Berlin / Heidelberg, vol. 57, n. 3, November 2014, pp. 555–576