×

Risk measurement with equivalent utility principles. (English) Zbl 1171.91326

Summary: Risk measures have been studied for several decades in the actuarial literature, where they appeared under the guise of premium calculation principles. Risk measures and properties that risk measures should satisfy have recently received considerable attention in the financial mathematics literature. Mathematically, a risk measure is a mapping from a class of random variables to the real line. Economically, a risk measure should capture the preferences of the decision-maker.
This paper complements the study initiated in M. Denuit, J. Dhaene and M. Van Wouwe [Bull. Swiss. Assoc. Actuar. 1999, No. 2, 137–175 (1999)] and considers several theories for decision under uncertainty: the classical expected utility paradigm, Yaari’s dual approach, maximin expected utility theory, Choquet expected utility theory and Quiggin’s rank-dependent utility theory. Building on the actuarial equivalent utility pricing principle, broad classes of risk measures are generated, of which most classical risk measures appear to be particular cases. This approach shows that most risk measures studied recently in the financial mathematics literature disregard the utility concept (i.e., correspond to linear utilities), restricting their applicability. Some alternatives proposed in the literature are discussed.

MSC:

91B06 Decision theory
91B30 Risk theory, insurance (MSC2010)
62P05 Applications of statistics to actuarial sciences and financial mathematics
PDFBibTeX XMLCite
Full Text: DOI Link