- UK/EU/International: Worldwide (International, UK and EU)
- Value: This project is open to self-funded students and is eligible for funding in an open competition across the School of Mathematics, see funding schemes for details.
- Number of awards: 1
- Deadline: Applications accepted all year round
Dr Stuart Barber and Dr Robert G Aykroyd. Contact Dr Stuart Barber to discuss this project further informally.
Duration data are a type of time series where we are interested both in the observed value of some variable and also how long it takes for the next event in a related sequence to happen. (For example, how frequently a given asset is traded and at what price, how often a group of animals visit a location and how many animals there are, or patient monitoring data recorded once per heartbeat).
They can be analysed in two different ways. One is to take the time intervals (durations) as the observations of interest, and then they become a regular time series which can be analysed using standard methods, or methods which have been proposed specifically for duration data. The classic reference here is Engle & Russell (1998). Such data could be analysed using wavelet methods such as wavelet variance (Percival & Walden, 2006) and the locally stationary wavelet process model (Nason, von Sachs & Kroisandt, 2000) to accommodate non-stationarity.
Another way is to use the values that are observed at the irregular time points and analyse these. There are fewer methods available for analysing irregular time series, and it would be interesting to develop wavelet tools for this. It would be even more interesting to bring the two ideas together and develop methods (wavelet or otherwise) to jointly analyse both the durations and the values observed at the irregular intervals.
- Engle, RF & Russell, JR (1998). Autoregressive conditional duration: A new model for irregularly spaced transaction data. Econometrica 66, 1127-1162.
- Percival, DB & Walden, AT (2006). Wavelet methods for time series analysis. Cambridge: Cambridge University Press.
- Nason, GP, Von Sachs, R, & Kroisandt, G (2000). Wavelet processes and adaptive estimation of the evolutionary wavelet spectrum. Journal of the Royal Statistical Society: Series B (Statistical Methodology), 62(2), 271-292.
Applications are invited from candidates with or expecting a minimum of a UK upper second class honours degree or equivalent in Mathematics or a related subject.
If English is not your first language, you must provide evidence that you meet the University’s minimum English Language requirements.
How to apply
Formal applications for research degree study should be made online through the university's website. Please state clearly in the research information section that the PhD you wish to be considered for is 'Locally stationary wavelet process models for autoregressive conditional duration data' as well as Dr Stuart Barber as your proposed supervisor.
We welcome scholarship applications from all suitably-qualified candidates, but UK black and minority ethnic (BME) researchers are currently under-represented in our Postgraduate Research community, and we would therefore particularly encourage applications from UK BME candidates. All scholarships will be awarded on the basis of merit.
If you require any further information please contact the Graduate School Office, e: email@example.com.