[BAČA P., MITKOVÁ V., 2007: Analysis of seasonal extreme flows using Peaks Over Threshold method. J. Hydrol. Hydromech., Vol. 55, No. 1, p. 16-22.]Search in Google Scholar
[BAYLISS A. C., JONES R. C., 1993: Peaks-over-threshold flood database: summary statistics and seasonality. Report No. 121, Institute of Hydrology, Wallingford, UK.]Search in Google Scholar
[BAYLISS A. C., 1999: Deriving flood peak data. Flood estimation Handbook. Vol. 3, p. 273-283.]Search in Google Scholar
[BEŇACKÁ O., 1976: Hydrologic Monograph of the Czechoslovak Danube Catchment. Part I Water Balance. (In Slovak.) Research reports S-R-531-VH-03-02. VÚVH, Bratislava.]Search in Google Scholar
[BUISHAND T. A., 1989: The partial duration series with a fixed number of peaks. J. Hydrology, 109, 1-9.10.1016/0022-1694(89)90002-4]Search in Google Scholar
[CLAPS P., LIO F., 2003: Can continuous stream flow data support flood frequency analysis? An alternative to the partial duration series approach. Water Resour. Res., 39, 8, p. 1216.10.1029/2002WR001868]Search in Google Scholar
[CUNNANE C., 1973: A particular comparison of annual maxima and partial duration series methods of flood frequency prediction. Journal of Hydrology, 18, p. 257-271.10.1016/0022-1694(73)90051-6]Search in Google Scholar
[CUNNANE C., 1979: A note on Poisson assumption in partial duration series model. Water Resour. Res., 15, 2, p. 489-494.10.1029/WR015i002p00489]Search in Google Scholar
[DAVISON A. C., SMITH R. L., 1990: Models for exceedances over high thresholds. J. R. Stat. Soc., 52, p. 393-442.10.1111/j.2517-6161.1990.tb01796.x]Search in Google Scholar
[EKANAYAKE S. T., CRUISE J. F., 1992: Comparisons of Weibull and exponential based partial duration stochastic flood models. Stochastic Hydrol. Hydraul., 7, p. 283-297.10.1007/BF01581616]Search in Google Scholar
[GIESECKE J., BARDOSSY A., MARKOVICH D., 2002: Extremwertstatistik. Endbericht. Bundesanstalt fuer Gewaessserkunde, Koblenz, 2002. 49 s.]Search in Google Scholar
[CHOW V. T., MAIDMENT D. R., MAYS L. W., 1988: Applied hydrology. McGraw-Hill, New York, NY.]Search in Google Scholar
[JARUŠKOVÁ D., HANEK M., 2006: Peaks over threshold method in comparison with block-maxima method for estimating high return levels of several Northern Moravia precipitation and discharges series. J. Hydrol. Hydromech., Vol. 54, No. 4, p. 309-319.]Search in Google Scholar
[KIRBY W., 1969: On the random occurrence of major floods. Water Resour. Res., 5, 4, p. 778-789.10.1029/WR005i004p00778]Search in Google Scholar
[KITE G. W., 1977: Frequency and risk analysis in hydrology. Water Res. Publications, Fort Collins, CO.]Search in Google Scholar
[KOHNOVÁ S., SZOLGAY J., 2000: Regional estimation of design flood discharges for river restoration in mountainous basins of northern Slovakia. In: Marsalek, et al. (eds.), Flood Issues in Contemporary Water Management, NATO Science Series, Vol. 71. Kluwer Academic Publishers, p. 41-47.10.1007/978-94-011-4140-6_4]Search in Google Scholar
[KONECNY F, NACHTNEBEL H. P., 1985: Extreme value processes and the evaluation of risk in flood analysis. Appl. Math. Modelling, 9, p. 11-15.10.1016/0307-904X(85)90135-0]Search in Google Scholar
[LANG M., OUARDA T. B M. J., BOBEE B., 1999: Towards operational quid lines for over threshold modelling. J. Hydrol., 225, p. 103-117.10.1016/S0022-1694(99)00167-5]Search in Google Scholar
[LANGBEIN W. B., 1949: Annual floods and the partial-duration flood series. Transactions, AGU 30, 6, p. 879-881.10.1029/TR030i006p00879]Search in Google Scholar
[MADSEN H., RASMUSSEN P. F., ROSBJERG D., 1997: Comparison of annual maximum series and partial duration series for modelling extreme hydrologic events. Water Resour. Res., 33, p. 747-757.10.1029/96WR03848]Search in Google Scholar
[MARES C., MARES I., STANCIU A., 2009: Extreme value analysis in the Danube lower basin discharge time series in the twentieth century, Theor. Appl. Climatol., 95, 223-233.10.1007/s00704-008-0001-0]Search in Google Scholar
[MITKOVÁ V., PEKÁROVÁ P., KOHNOVÁ S., SZOLGAY J., 2003: Porovnanie odhadov návrhových maximálnych prietokov pri rôznom spôsobe zostavenia štatistického radu kulminačných prietokov v profile Dunaj Bratislava. Sborník příspěvků z Workshopu "Extrémní hydrologcké jevy v povodích", Praha, str. 61-70.]Search in Google Scholar
[NORTH M., 1980: Time-dependent stochastic models of flood. ASCE J. Hydraul. Div., 106, p. 649-665.10.1061/JYCEAJ.0005415]Search in Google Scholar
[ONOZ B., BAYZAIT M., 2001: Effect of the occurrence process of the peaks over threshold on the flood estimation. J. Hydrol., 244, p. 86-96.10.1016/S0022-1694(01)00330-4]Search in Google Scholar
[RAO A. R., HAMED K. H., 2000: Flood frequency analysis. CRC Press LLC, N. W. Corporate Blvd., Boca Raton, Florida.]Search in Google Scholar
[RASMUSSEN P. F., ROSBJERG D., 1991 a: Evaluation of risk concepts in partial duration series. Stochastic Hydrol. Hydraul., 5, p. 1-16.10.1007/BF01544174]Search in Google Scholar
[RASMUSSEN P. F., ROSBJERG D., 1991 b: Prediction uncertainty in seasonal partial duration series. Stochastic Hydrol. Hydraul., 1, p. 3-16.10.1007/BF01543906]Search in Google Scholar
[RASMUSSEN P. F., ROSBJERG D., 1989: Risk estimation in partial duration series. Water Resour. Res., 25, p. 2319-2330.10.1029/WR025i011p02319]Search in Google Scholar
[ROSBJERG D., 1977: Returns periods of hydrological events. Nordic Hydrol., 8, 57-61.10.2166/nh.1977.0005]Search in Google Scholar
[ROSBJERG D., 1985: Estimation in partial duration series with independent peak values. J. Hydrol., 76, p. 183-195.10.1016/0022-1694(85)90098-8]Search in Google Scholar
[ROSBJERG D., RASMUSSEN P. F, MADSEN H., 1991: Modelling of exceedances in partial duration series. Proc. Int. Hydrol. and Water Resour. Symp. Perth, p. 117-760.]Search in Google Scholar
[ROSBJERG D., 1987: Partial duration series with Lognormal distributed peak values. In: Hydrological Frequency Modelling. V. P. Singh. (ed.). Reidel, p. 117-129.10.1007/978-94-009-3953-0_7]Search in Google Scholar
[ROSBJERG D., MADSEN H, RASMUSSEN P. F., 1992: Prediction in partial duration series with generalized Pareto distributed exceedances. Water Resour Res., 28, p. 3001-3010.10.1029/92WR01750]Search in Google Scholar
[SVOBODA A., PEKÁROVÁ P., MIKLÁNEK P., 2000: Flood hydrology of Danube between Devín and Nagymaros. SVH-ÚH SAV, pp. 96.]Search in Google Scholar
[SZOLGAY J., KOHNOVÁ S., HLAVČOVÁ K., 2003: Ilustrácia neistoty určovania N-ročných maximálnych prietokov Dunaja v Bratislave. Konferencia s medzinárodnou účasťou "Ochrana pred povodňami a bezpečnosť vodných stavieb." Bratislava, s. 7-12.]Search in Google Scholar
[SHANE R. M., LYNN W. R., 1964: Mathematical model for flood risk analysis. ASCE J. Hydraul. Div., 90, 1-20.10.1061/JYCEAJ.0001127]Search in Google Scholar
[TODAROVIČ P., 1970: On some problems involving random number of random variables. Ann. Math. Statistics, Vol. 41, No. 3, p. 1059-1063.10.1214/aoms/1177696981]Search in Google Scholar
[VUKMIROVIČ V., PETROVIČ J., 1995: Flood flow analysis using renewal processes. Grupe AMHY, Seminar annual.]Search in Google Scholar
[ZATKALÍK G., 1965: The 1965 Danube flood. (In Slovak). Vodní hospodářství, 12, 519-526.10.3406/jatba.1965.2848]Search in Google Scholar
[ZEELENHASIC E., 1970: Theoretical probability distributions for flood peaks. Hydrology Paper No. 42, Colorado State University, Fort Collins, Co.]Search in Google Scholar
[WANG Q. J., 1991: The POT model described by the generalized Pareto distribution with Poisson arrayal rate. J. Hydrol., 129, p. 263-280.10.1016/0022-1694(91)90054-L]Search in Google Scholar
