Discounted maximum loss explained

Discounted maximum loss, also known as worst-case risk measure, is the present value of the worst-case scenario for a financial portfolio.

In investment, in order to protect the value of an investment, one must consider all possible alternatives to the initial investment. How one does this comes down to personal preference; however, the worst possible alternative is generally considered to be the benchmark against which all other options are measured. The present value of this worst possible outcome is the discounted maximum loss.

Definition

Given a finite state space

S

, let

X

be a portfolio with profit

Xs

for

s\inS

. If

X1:S,...,XS:S

is the order statistic the discounted maximum loss is simply

-\deltaX1:S

, where

\delta

is the discount factor.

(\Omega,l{F},P)

, let

X

be a portfolio with discounted return

\deltaX(\omega)

for state

\omega\in\Omega

. Then the discounted maximum loss can be written as

-\operatorname{ess.inf}\deltaX=-\sup\delta\{x\inR:P(X\geqx)=1\}

where

\operatorname{ess.inf}

denotes the essential infimum.[1]

Properties

\alpha=0

. It is therefore a coherent risk measure.

\rhomax

is the most conservative (normalized) risk measure in the sense that for any risk measure

\rho

and any portfolio

X

then

\rho(X)\leq\rhomax(X)

.[1]

Example

As an example, assume that a portfolio is currently worth 100, and the discount factor is 0.8 (corresponding to an interest rate of 25%):

probabilityvalue
of eventof the portfolio
40%110
30%70
20%150
10%20

In this case the maximum loss is from 100 to 20 = 80, so the discounted maximum loss is simply

80 x 0.8=64

Notes and References

  1. Schied . Alexander . 2006 . Risk Measures and Robust Optimization Problems . Stochastic Models . 22 . 4 . 753–831 . 10.1080/15326340600878677 . 122890427 . 1532-6349.