Maximum VaR Deviation for Gain. There are M Linear Loss scenario functions (every Linear Loss scenario function is defined by a Matrix of Scenarios). M new VaR Deviation for Gain functions are calculated (for every -(Loss) scenario function). Maximum VaR Deviation for Gain is calculated by taking Maximum over M VaR Deviation for Gain functions (based on -(Loss) scenarios).
Syntax
max_var_dev_g(α,matrix_1,matrix_2,...,matrix_M) |
short call |
max_var_dev_g_name(α,matrix_1,matrix_2,...,matrix_M) |
call with optional name |
Parameters
matrix_m is a Matrix of Scenarios:
where the header row contains names of variables (except scenario_probability, and scenario_benchmark). Other rows contain numerical data. The scenario_probability, and scenario_benchmark columns are optional.
is a confidence level,
.
Mathematical Definition
Maximum CVaR Deviation for Gain function is calculated as follows
,
where:
is VaR Deviation for Gain function,
M = number of random Loss Functions
,
= vector of random coefficients for m-th Loss Function;
= j-th scenario of the random vector ,
is an argument of Maximum VaR Deviation for Gain function.
Remarks
Data for calculation of Maximum VaR Deviation for Gain are represented by a set of matrices of scenarios which may be in pmatrix form.
Example
See also
Maximum, Maximum for Gain, Maximum Deviation, Maximum Deviation for Gain, Maximum CVaR , Maximum CVaR for Gain, Maximum CVaR Deviation, Maximum CVaR Deviation for Gain, Maximum VaR , Maximum VaR for Gain, Maximum VaR Deviation