Chapter 16 - Extreme Value Theory Flashcards
Fat tails that are observed in financial data are the result of two factors:
Returns are heteroscedastic –> volatility varies over time in a stochastic way
Innovations in heteroscedastic models are best modelled using a fat tailed distribution
Underlying distributions
Will Go Fishing
Weibull Gumbell Frechet
SP: L0
BUT (Beta, Uniform, Triangular)
CW GLEN
Chi-Square, Weibull
Gamma, Lognormal, Exponential, Normal
Try Let Fish Bite Properly T dist LogGamma F dist Burr Pareto
EVT - rough criteria to predict which family it belongs to:
Weibull: distributions that have upper limits
Gumbell: distributions with finite moments of all orders
Frechet: Heavy tail distributions, with higher moments that can be finite
Generalised Extreme Value (GEV) describes distribution of maximum values, to get we divide data into blocks, and calculate maximum for each block. Can be used to analyse a set of observed data in two different ways:
Return level: Select max observation in each block, fewer blocks give more information about extreme values, but increases variance
Return period: Count the # of observations in each block that exceed some set level
