The Effect of Non‐Stationarity on Extreme Sea‐Level Estimation

The sea-level is the composition of astronomical tidal and meteorological surge processes. It exhibits temporal non-stationarity due to a combination of long-term trend in the mean level, the deterministic tidal component, surge seasonality and interactions between the tide and surge. We assess the effect of these non-stationarities on the estimation of the distribution of extreme sea-levels. This is important for coastal flood assessment as the traditional method of analysis assumes that, once the trend has been removed, extreme sea-levels are from a stationary sequence. We compare the traditional approach with a recently proposed alternative that incorporates the knowledge of the tidal component and its associated interactions, by applying them to 22 UK data sites and through a simulation study. Our main finding is that if the tidal non-stationarity is ignored then a substantial underestimation of extreme sea-levels results for most sites. In contrast, if surge seasonality and the tide–surge interaction are not modelled the traditional approach produces little additional bias. The alternative method is found to perform well but requires substantially more statistical modelling and better data quality.

[1]  Jonathan A. Tawn,et al.  Statistics of coastal flood prevention , 1990, Philosophical Transactions of the Royal Society of London. Series A: Physical and Engineering Sciences.

[2]  G. W. Lennon,et al.  A FREQUENCY INVESTIGATION OF ABNORMALLY HIGH TIDAL LEVELS AT CERTAIN WEST COAST PORTS. , 1963 .

[3]  N. B. Webber,et al.  An alternative approach to the joint probability method for extreme high sea level computations , 1982 .

[4]  Malcolm R Leadbetter,et al.  Extremes and local dependence in stationary sequences , 1983 .

[5]  J. R. Wallis,et al.  Estimation of the generalized extreme-value distribution by the method of probability-weighted moments , 1985 .

[6]  Joel L. Horowitz,et al.  Extreme Values from a Nonstationary Stochastic Process: An Application to Air Quality Analysis , 1980 .

[7]  J. D. T. Oliveira Asymptotic behaviour of maxima with periodic disturbances , 1976 .

[8]  M. Dixon,et al.  Trends in UK extreme sea-levels: a spatial approach , 1992 .

[9]  Richard L. Smith,et al.  Models for exceedances over high thresholds , 1990 .

[10]  Jonathan A. Tawn,et al.  An extreme-value theory model for dependent observations , 1988 .

[11]  C. T. Suthons FREQUENCY OF OCCURENCE OF ABNORMALLY HIGH SEA LEVELS ON THE EAST AND SOUTH COASTS OF ENGLAND. , 1963 .

[12]  Keith R. Thompson,et al.  Return periods of extreme sea levels from short records , 1986 .

[13]  Richard L. Smith Extreme value theory based on the r largest annual events , 1986 .

[14]  David Pugh,et al.  Extreme Sea Levels from Tide and Surge Probability , 1978 .