Deviation risk measure

In financial mathematics, a deviation risk measure is a function to quantify financial risk (and not necessarily downside risk) in a different method than a general risk measure. Deviation risk measures generalize the concept of standard deviation.

Mathematical definition

A function D: \mathcal{L}^2 \to [0,+\infty], where \mathcal{L}^2 is the L2 space of random portfolio returns, is a deviation risk measure if

  1. Shift-invariant: D(X + r) = D(X) for any r \in \mathbb{R}
  2. Normalization: D(0) = 0
  3. Positively homogeneous: D(\lambda X) = \lambda D(X) for any X \in \mathcal{L}^2 and \lambda > 0
  4. Sublinearity: D(X + Y) \leq D(X) + D(Y) for any X, Y \in \mathcal{L}^2
  5. Positivity: D(X) > 0 for all nonconstant X, and D(X) = 0 for any constant X.[1][2]

Relation to risk measure

There is a one-to-one relationship between a deviation risk measure D and an expectation-bounded risk measure R where for any X \in \mathcal{L}^2

R is expectation bounded if R(X) > \mathbb{E}[-X] for any nonconstant X and R(X) = \mathbb{E}[-X] for any constant X.

If D(X) < \mathbb{E}[X] - \operatorname{ess\inf} X for every X (where \operatorname{ess\inf} is the essential infimum), then there is a relationship between D and a coherent risk measure.[1]

Examples

The standard deviation is clearly a deviation risk measure.

See also

References

  1. 1 2 Rockafellar, Tyrrell; Uryasev, Stanislav; Zabarankin, Michael (2002). "Deviation Measures in Risk Analysis and Optimization". Retrieved January 15, 2012.
  2. Cheng, Siwei; Liu, Yanhui; Wang, Shouyang (2004). "Progress in Risk Measurement". Advanced Modelling and Optimization 6 (1).
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