gaussianPotentialUpside (3) - Linux Manuals
gaussianPotentialUpside: Statistics tool for gaussian-assumption risk measures.
NAME
QuantLib::GenericGaussianStatistics - Statistics tool for gaussian-assumption risk measures.
SYNOPSIS
#include <ql/math/statistics/gaussianstatistics.hpp>
Inherits Stat.
Public Types
typedef Stat::value_type value_type
Public Member Functions
GenericGaussianStatistics (const Stat &s)
Gaussian risk measures
Real gaussianDownsideVariance () const
Real gaussianDownsideDeviation () const
Real gaussianRegret (Real target) const
Real gaussianPercentile (Real percentile) const
Real gaussianTopPercentile (Real percentile) const
Real gaussianPotentialUpside (Real percentile) const
gaussian-assumption Potential-Upside at a given percentile
Real gaussianValueAtRisk (Real percentile) const
gaussian-assumption Value-At-Risk at a given percentile
Real gaussianExpectedShortfall (Real percentile) const
gaussian-assumption Expected Shortfall at a given percentile
Real gaussianShortfall (Real target) const
gaussian-assumption Shortfall (observations below target)
Real gaussianAverageShortfall (Real target) const
gaussian-assumption Average Shortfall (averaged shortfallness)
Detailed Description
template<class Stat> class QuantLib::GenericGaussianStatistics< Stat >
Statistics tool for gaussian-assumption risk measures.This class wraps a somewhat generic statistic tool and adds a number of gaussian risk measures (e.g.: value-at-risk, expected shortfall, etc.) based on the mean and variance provided by the underlying statistic tool.
Member Function Documentation
Real gaussianDownsideVariance () const
returns the downside variance, defined as [ ac{N}{N-1} imes ac{ um_{i=1}^{N} heta imes x_i^{2}}{ um_{i=1}^{N} w_i} ], where $ heta $ = 0 if x > 0 and $ heta $ =1 if x <0
Real gaussianDownsideDeviation () const
returns the downside deviation, defined as the square root of the downside variance.
Real gaussianRegret (Real target) const
returns the variance of observations below target [ ac{um w_i (min(0, x_i-target))^2 }{um w_i}. ]
See Dembo, Freeman 'The Rules Of Risk', Wiley (2001)
Real gaussianPercentile (Real percentile) const
gaussian-assumption y-th percentile, defined as the value x such that [ y = ac{1}{qrt{2
i}} int_{-infty}^{x} \xp (-u^2/2) du ]
Precondition:
- percentile must be in range (0-100%) extremes excluded
Real gaussianTopPercentile (Real percentile) const
Precondition:
- percentile must be in range (0-100%) extremes excluded
Real gaussianPotentialUpside (Real percentile) const
gaussian-assumption Potential-Upside at a given percentile
Precondition:
- percentile must be in range [90-100%)
Real gaussianValueAtRisk (Real percentile) const
gaussian-assumption Value-At-Risk at a given percentile
Precondition:
- percentile must be in range [90-100%)
Real gaussianExpectedShortfall (Real percentile) const
gaussian-assumption Expected Shortfall at a given percentile
Assuming a gaussian distribution it returns the expected loss in case that the loss exceeded a VaR threshold,
[ mathrm{E}
average of observations below the given percentile $ p $. Also know as conditional value-at-risk.
See Artzner, Delbaen, Eber and Heath, 'Coherent measures of risk', Mathematical Finance 9 (1999)
Precondition:
- percentile must be in range [90-100%)
Author
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