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Homogeneous Premium Calculation Principles

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  • Reich, Axel

Abstract

A premium calculation principle π is called positively homogeneous if π(cX) = cπ(X) for all c > 0 and all random variables X. For all known principles it is shown that this condition is fulfilled if it is satisfied for two specific values of c only, say c = 2 and c = 3, and for only all two point random variables X. In the case of the Esscher principle one value of c suffices. In short this means that local homogeneity implies global homogeneity. From this it follows that in the case of the zero utility principle or Swiss premium calculation principle, the underlying utility function is of a very specific type. A very general theorem on premium calculation principles which satisfy a weak continuity condition, is added. Among others the proof uses Kroneckers Theorem on Diophantine Approximations.

Suggested Citation

  • Reich, Axel, 1984. "Homogeneous Premium Calculation Principles," ASTIN Bulletin, Cambridge University Press, vol. 14(2), pages 123-133, October.
  • Handle: RePEc:cup:astinb:v:14:y:1984:i:02:p:123-133_00
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    Cited by:

    1. Chudziak, J., 2020. "On positive homogeneity and comonotonic additivity of the principle of equivalent utility under Cumulative Prospect Theory," Insurance: Mathematics and Economics, Elsevier, vol. 94(C), pages 154-159.

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