References
- M.Arendarczyk and K.De¸bicki, Asymptotics of supremum distribution of a Gaussian process over a Weibullian time, Bernoulli.17(1) (2011), pp. 194–210.
- S.M.Berman, Limit theorems for the maximum term in stationary sequences, Ann. Math. Stat.35 (1964), pp. 502–516.
- S.M.Berman, Sojourns and Extremes of Stochastic Processes, The Wadsworth & Brooks/Cole Statistics/Probability Series, Wadsworth & Brooks/Cole Advanced Books & Software, Pacific Grove, CA, xiv+300 pp1992.
- G. Biau and D.M. Mason, High-dimensional p-norms, Available at arXiv:1311.0587v1 (2013)
- P.J.Brockwell and R.A.Davis, Time Series: Theory and Methods, 2nd ed., Springer Series in Statistics, Springer-Verlag, New York, xvi+577 pp.1991.
- L.Cao and Z.Peng, Asymptotic distributions of maxima of complete and incomplete samples from strongly dependent stationary Gaussian sequences, Appl. Math. Lett.24(2) (2011), pp. 243–247, 10.1016/j.aml.2010.09.012.
- R.A.Davis, Maxima and minima of stationary sequences, Ann. Probab.7(3) (1979), pp. 453–460.
- P.Embrechts, C.Klüppelberg, and T.Mikosch, Modelling Extremal Events, Applications of Mathematics (New York), Vol. 33, Springer-Verlag, Berlin, for insurance and finance, xvi+645 pp.1997.
- M.Falk, J.Hüsler, and R.-D.Reiss, Laws of small numbers: Extremes and rare events, in DMV seminar, 3rd ed, Vol. 23, Birkhäuser, Basel, 2010.
- E.Hashorva and J.Hüsler, Extreme values in FGM random sequences, J. Multivariate Anal.68(2) (1999), pp. 212–225, 10.1006/jmva.1998.1795.
- E.Hashorva, Z.Peng, and Z.Weng, Limit distributions of exceedances point processes of scaled stationary Gaussian sequences, Probab. Math. Stat., in press (2013)
- E.Hashorva, Z.Peng, and Z.Weng, On Piterbarg theorem for maxima of stationary Gaussian sequences, Lithuanian Math. J.53(3) (2013), pp. 280–292.
- E.Hashorva and Z.Weng, Limit laws for maxima of contracted stationary Gaussian sequences, Commun. Stat. Theory Method., in press (2013)
- T.Krajka, The asymptotic behaviour of maxima of complete and incomplete samples from stationary sequences, Stoch. Process. Appl.121(8) (2011), pp. 1705–1719.
- A.V.Kudrov and V.I.Piterbarg, On maxima of partial samples in Gaussian sequences with pseudo-stationary trends, Lithuanian Math. J.47(1) (2007), pp. 48–56.
- M.R.Leadbetter, G.Lindgren, and H.Rootzén, Extremes and Related Properties of Random Sequences and Processes, Vol. 11, Springer-Verlag, New York, 1983.
- A.T.Martinsek, Sequential estimation of the mean in a random coefficient autoregressive model with beta marginals, Stat. Probab. Lett.51(1) (2001), pp. 53–61.
- P.Mladenović and V.I.Piterbarg, On asymptotic distribution of maxima of complete and incomplete samples from stationary sequences, Stoch. Process. Appl.116(12) (2006), pp. 1977–1991, 10.1016/j.spa.2006.05.009.
- M.F.Oliveira and K.F.Turkman, A note on the asymptotic independence of maximum and minimum of stationary sequences with extremal index, Portugal. Math.49(1) (1992), pp. 29–36.
- Z.Peng, B.Tong, and S.Nadarajah, Almost sure central limit theorems of the partial sums and maxima from complete and incomplete samples of stationary sequences, Stoch. Dyn.12(3), (2012), pp. 1150026, 19.
- Z.Peng, Z.Weng, and S.Nadarajah, Joint limiting distributions of maxima and minima for complete and incomplete samples from weakly dependent stationary sequences, J. Comput. Anal. Appl.13(5) (2011), pp. 875–880.
- S.I.Resnick, Extreme Values, Regular Variation, and Point Processes, Springer-Verlag, New York, 1987.
- Z.Tan and Y.Wang, Some asymptotic results on extremes of incomplete samples, Extremes.15(3) (2012), pp. 319–332.
- M.G.Temido, Maxima and minima of stationary random sequences under a local dependence restriction, Portugal. Math.56(1) (1999), pp. 59–72.