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

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

• ${\displaystyle D(X)=R(X-\mathbb {E} [X])}$ 
• ${\displaystyle R(X)=D(X)-\mathbb {E} [X]}$ .

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

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

Examples

The most well-known examples of risk deviation measures are:^[1]

• Standard deviation ${\displaystyle \sigma (X)={\sqrt {E[(X-EX)^{2}]}}}$ ;
• Average absolute deviation ${\displaystyle MAD(X)=E(|X-EX|)}$ ;
• Lower and upper semideviations ${\displaystyle \sigma _{-}(X)={\sqrt {{E[(X-EX)_{-}}^{2}]}}}$  and ${\displaystyle \sigma _{+}(X)={\sqrt {{E[(X-EX)_{+}}^{2}]}}}$ , where ${\displaystyle [X]_{-}:=\max\{0,-X\}}$  and ${\displaystyle [X]_{+}:=\max\{0,X\}}$ ;
• Range-based deviations, for example, ${\displaystyle D(X)=EX-\inf X}$  and ${\displaystyle D(X)=\sup X-\inf X}$ ;
• Conditional value-at-risk (CVaR) deviation, defined for any ${\displaystyle \alpha \in (0,1)}$  by ${\displaystyle {\rm {CVaR}}_{\alpha }^{\Delta }(X)\equiv ES_{\alpha }(X-EX)}$ , where ${\displaystyle ES_{\alpha }(X)}$  is Expected shortfall.

See also

• Unitized risk

References

1. Rockafellar, Tyrrell; Uryasev, Stanislav; Zabarankin, Michael (2002). "Deviation Measures in Risk Analysis and Optimization". SSRN 365640. {{cite journal}}: Cite journal requires |journal= (help)
2. Cheng, Siwei; Liu, Yanhui; Wang, Shouyang (2004). "Progress in Risk Measurement". Advanced Modelling and Optimization. 6 (1).