Tail fitting probability distributions for risk management purposes
This presentation describes:
- why the 'tail' behaviour of distributions of returns or losses is important (i.e. the magnitude of extreme outcomes),
- Traditional Extreme Value Theory (EVT) techniques that have previously been used to model such behaviour, and their strengths and weaknesses
- Some new refinements explained in the presentation and an attached paper allowing tail behaviour to be fitted using arbitrary distributional forms
- Other uses of such techniques, including 'quantile interpolation' for fast evaluation of risk measures such as Value-at-Risk.
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Slides
| 1 | Tail fitting probability distributions for risk management purposes |
| 2 | Agenda |
| 3 | Agenda |
| 4 | Why is tail behaviour important? (1) |
| 5 | Why is tail behaviour important? (2) |
| 6 | Why is tail behaviour important? (3) |
| 7 | Agenda |
| 8 | Extreme Value Theory (EVT) |
| 9 | Traditional EVT results |
| 10 | But is EVT the only or best way of fitting the tail? |
| 11 | Potential weaknesses of EVT |
| 12 | Agenda |
| 13 | Tail-weighted distribution fitting |
| 14 | Tail weighted maximum likelihood (TWMLE) |
| 15 | Tail weighted least squares (TWLS) |
| 16 | Example analysis |
| 17 | Key takeaways |
| 18 | Agenda |
| 19 | Fitting distributions around specific quantiles |
| 20 | Quantile interpolation (1) |
| 21 | Quantile interpolation (2) |
| 22 | Quantile interpolation: Results (1) |
| 23 | Quantile interpolation: Results (2) |
| 24 | Summary |
| 25 | Appendix A: Visualising fat-tailed behaviour |
| 26 | Quantile-quantile plots: other comments |
| 27 | Quantile-quantile plots |
| 28 | More periods give more scope for extreme events |
| 29 | Appendix B: Time-varying volatility |
| 30 | Important Information |
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