Exercise
You are asked to consider whether the risk measure [math]\rho ( X ) = E( X ) [/math] is coherent.
Determine which of the following statements is correct.
- [math]\rho ( X )[/math] does NOT possess subadditivity.
- [math]\rho( X ) [/math] does NOT possess monotonicity.
- [math]\rho( X ) [/math] does NOT possess positive homogeneity.
- [math]\rho( X ) [/math] does NOT possess translation invariance.
- [math]\rho ( X )[/math] is a coherent risk measure.
Copyright 2023. The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.
Key: E
Subadditivity holds: [math]\rho ( X + Y ) = \operatorname{E}( X + Y ) = \operatorname{E}( X ) + \operatorname{E}(Y ) = \rho ( X ) + \rho (Y ) [/math]
Monotonicity holds: If [math]X ≤ Y[/math], then [math]\rho ( X ) = \operatorname{E}( X ) \leq \rho (Y ) = \operatorname{E}(Y ) [/math]
Positive homogeneity holds: [math]\rho (cX ) = \operatorname{E}(cX ) = c\operatorname{E}( X ) = c\rho ( X ) [/math]
Translation invariance holds: [math]\rho ( X + c) = \operatorname{E}( X + c) = \operatorname{E}( X ) + c = \rho ( X ) + c [/math]
Since [math]\rho ( X ) = \operatorname{E}( X )[/math] satisfies all four properties, it is coherent.
Copyright 2023. The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.