https://orcid.org/0000-0002-4642-5683
References
- Carvalho RLS, Nascimento BIS, Querino CAS, et al. Comportamento das séries temporais de temperatura do Ar, umidade e precipitação pluviométrica no município de ariquemes (Rondônia-Brasil) (air temperature, humidity and rainy precipitation time series behavior in ariquemes town (Rondônia, Brazil)). Rev Bras Climatol. 2016 7;18:123–142. https://revistas.ufpr.br/revistaabclima/article/view/43228
- Leadbetter MR, Lindgren G, Rootzén H. Extremes and related properties of random sequences and processes. New York: Springer-Verlag; 1983.
- Leadbetter MR, Nandagopalan S. On exceedance point processes for stationary sequences under mild oscillation restrictions; 1989. doi:10.1007/978-1-4612-3634-4_7
- Hsing T HJ, Leadbetter MR. On the exceedance of point process for a stationary sequence. Probab Theory Relat Fields. 1988;78:97–112. doi:10.1007/BF00718038
- Hsing T. On tail estimation using dependent data. Ann Stat. 1991;19:1547–1569. doi:10.1214/aos/1176348261
- Gomes MI. On the estimation of parameters of rare events in environmental time series. In: Barnett V, Turkman K, editors. Statistics for the environment. Vol. 2. New York: Wiley; 1993. p. 225–241.
- Smith RL, Weissman I. Estimating the extremal index. J R Stat Soc Ser B. 1994;56(3):515–528.
- Ancona-Navarrete M, Tawn J. A comparison of methods for estimating the extremal index. Extremes. 2000;3(1):5–38. doi:10.1023/A:1009993419559
- Ferro CAT, Segers J. Inference for clusters of extreme values. J R Stat Soc Ser B. 2003;65(2):545–556. doi:10.1111/1467-9868.00401
- Gomes MI, Hall A, Miranda MC. Subsampling techniques and the Jackknife methodology in the estimation of the extremal index. Comput Stat Data Anal. 2008;52(4):2022–2041. doi:10.1016/j.csda.2007.06.023
- Süveges M. Likelihood estimation of the extremal index. Extremes. 2007;10(1–2):41–55. doi:10.1007/s10687-007-0034-2
- Süveges M, Davison AC. Model misspecification in peaks over threshold analysis. Ann Appl Stat. 2010;4(1):203–221.
- Northrop P. Introducing exdex: estimation of the extremal index; 2019. Available from: https://cran.r-project.org/web/packages/exdex/vignettes/exdex-vignette.html.
- Ferreira H, Ferreira M. Estimating the extremal index through local dependence. Ann l'Inst Henri Poincaré-Probab Stat. 2018 may;54(2):587–605.
- Ferreira M. Heuristic tools for the estimation of the extremal index: a comparison of methods. Revstat. 2018;16(1):115–136.
- Holešovský J, Fusek M. Estimation of the extremal index using censored distributions. Extremes. 2020;23:197–213. doi:10.1007/s10687-020-00374-3
- Holešovský J, Fusek M. Improved interexceedance-times-based estimator of the extremal index using truncated distribution. Extremes. 2022 06;25:1–26. doi:10.1007/s10687-021-00424-4
- Cai JJ. A nonparametric estimator of the extremal index; 2019. Available from: https://arxiv.org/pdf/1911.06674.pdf
- Gomes MI, Miranda MC, Souto de Miranda M. A note on robust estimation of the extremal index. In: Rocca ML, Liseo B, Salmaso L, editors. I4th Conference of International Society for Nonparametric Statistics (ISNPS 2018). Palermo: Springer; 2020. p. 213–225.
- O'Brien GL. Extreme values for stationary and Markov sequences. Ann Probab. 1987;15(1):281–291. doi:10.1214/aop/1176992270
- Northrop PJ. An efficient semiparametric maxima estimator of the extremal index. Extremes. 2015;18:585–603. doi:10.1007/s10687-015-0221-5
- Souto de Miranda M, Miranda M, Gomes M. A robust hurdle Poisson model in the estimation of the extremal index. In: Bispo, Regina and Henriques-Rodrigues, Lígia and Alpizar-Jara, Russell and Carvalho, Miguel de, editors. Recent developments in statistics and data science. San Diego (CA): Springer, Cham; 2022. p. 15–28.
- Min Y, Agresti A. Modeling nonnegative data with clumping at zero: a survey. J Iran Stat Soc. 2002;1(1):7–33.
- Aeberhard WH, Cantoni E, Heritier S. Robust inference in the negative binomial regression model with an application to falls data. Biometrics. 2014 12;70:920–931. doi:10.1111/biom.v70.4
- Hilbe JM. Negative binomial regression. 2nd ed. New York: Cambridge University Press; 2011.
- Bianco AM, Yohai VJ. Robust estimation in the logistic regression model. New York (NY): Springer; 1996.
- Cantoni E, Zedini A. A robust version of the hurdlemodel. J Stat Plan Inference. 2011;141(3):1214–1223. doi:10.1016/j.jspi.2010.09.022
- Alpuim MT. An extremal Markovian sequence. J Appl Prob. 1989;26:219–232. doi:10.2307/3214030
- Castillo E., Hadi A., Sarabia J. M., et al. Extreme value and related models with applications in engineering and science. Hoboken, NJ: Wiley; 2005.
- Canto e Castro L. Sobre a teoria assintótica de extremos [dissertation]. University of Lisbon; 1992.
- Miranda MC. Estatística de extremos: estimação dos índices extremal e de cauda [dissertation]. Lisbon: University of Lisbon; 2004.
- Berghaus B, Bücher A. Weak convergence of a pseudo maximum likelihood estimator for the extremal index. 2018 Oct;46(5):2307–2335. Available from: https://projecteuclid.org/journals/annals-of-statistics/volume-46/issue-5/Weak-convergence-of-a-pseudo-maximum-likelihood-estimator-for-the/10.1214/17-AOS1621.full.
- Cerqueira V, Torgo L, Mozetič I. Evaluating time series forecasting models: an empirical study on performance estimation methods. Mach Learn. 2020 11;109:1997–2028. doi:10.1007/s10994-020-05910-7