https://orcid.org/0000-0002-8537-6191
References
- Acharya, V. V., Pedersen, L. H., Philippon, T., and Richardson, M. (2017), “Measuring Systemic Risk,” The Review of Financial Studies, 30, 2–47. DOI: 10.1093/rfs/hhw088.
- Artzner, P., Delbaen, F., Eber, J.-M., and Heath, D. (1999), “Coherent Measures of Risk,” Mathematical Finance, 9, 203–228. DOI: 10.1111/1467-9965.00068.
- Bellini, F., and Di Bernardino, E. (2017), “Risk Management with Expectiles,” The European Journal of Finance, 23, 487–506. DOI: 10.1080/1351847X.2015.1052150.
- Bellini, F., Klar, B., Müller, A., and Gianin, E. R. (2014), “Generalized Quantiles as Risk Measures,” Insurance: Mathematics and Economics, 54, 41–48. DOI: 10.1016/j.insmatheco.2013.10.015.
- Boussama, F., Fuchs, F., and Stelzer, R. (2011), “Stationarity and Geometric Ergodicity of BEKK Multivariate GARCH Models,” Stochastic Processes and their Applications, 121, 2331–2360. DOI: 10.1016/j.spa.2011.06.001.
- Brownlees, C. T., and Engle, R. (2017), “SRISK: A Conditional Capital Shortfall Measure of Systemic Risk,” The Review of Financial Studies, 30, 48–79. DOI: 10.1093/rfs/hhw060.
- Cai, J.-J., Einmahl, J. H. J., de Haan, L., and Zhou, C. (2015), “Estimation of the Marginal Expected Shortfall: The Mean When a Related Variable is Extreme,” Journal of the Royal Statistical Society, Series B, 77, 417–442. DOI: 10.1111/rssb.12069.
- Chavez-Demoulin, V., and Guillou, A. (2018), “Extreme Quantile Estimation for β-Mixing Time Series and Applications,” Insurance: Mathematics and Economics, 83, 59–74. DOI: 10.1016/j.insmatheco.2018.09.004.
- Daouia, A., Girard, S., and Stupfler, G. (2018), “Estimation of Tail Risk Based on Extreme Expectiles,” Journal of the Royal Statistical Society, Series B, 80, 263–292. DOI: 10.1111/rssb.12254.
- Daouia, A., Girard, S., and Stupfler, G. (2019), “Extreme M-quantiles as Risk Measures: From L1 to Lp Optimization,” Bernoulli, 25, 264–309.
- Daouia, A., Girard, S., and Stupfler, G. (2020), “Tail Expectile Process and Risk Assessment,” Bernoulli, 26, 531–556.
- de Haan, L., and Ferreira, A. (2006), Extreme Value Theory: An Introduction, New York: Springer.
- de Haan, L., Mercadier, C., and Zhou, C. (2016), “Adapting Extreme Value Statistics to Financial Time Series: Dealing with Bias and Serial Dependence,” Finance and Stochastics, 20, 321–354. DOI: 10.1007/s00780-015-0287-6.
- Doukhan, P. (1994), Mixing: Properties and Examples, New York: Springer.
- Drees, H. (2000), “Weighted Approximations of Tail Processes for β-Mixing Random Variables,” Annals of Applied Probability, 10, 1274–1301.
- Drees, H. (2003), “Extreme Quantile Estimation for Dependent Data, with Applications to Finance,” Bernoulli, 9, 617–657.
- Drees, H., and Rootzén, H. (2010), “Limit Theorems for Empirical Processes of Cluster Functionals,” Annals of Statistics, 38, 2145– 2186.
- Embrechts, P., Klüppelberg, C., and Mikosch, T. (1997), Modelling Extremal Events for Insurance and Finance, Berlin: Springer-Verlag.
- Fisher, T. J., and Gallagher, C. M. (2012), “New Weighted Portmanteau Statistics for Time Series Goodness of Fit Testing,” Journal of the American Statistical Association, 107, 777–787. DOI: 10.1080/01621459.2012.688465.
- Francq, C., and Zakoïan, J.-M. (2006), “Mixing Properties of a General Class of GARCH(1,1) Models Without Moment Assumptions on the Observed Process,” Econometric Theory, 22, 815–834. DOI: 10.1017/S0266466606060373.
- Galanos, A. and Kley, T. (2022), rugarch: Univariate GARCH Models, R package version 1.4–6.
- Girard, S., Stupfler, G., and Usseglio-Carleve, A. (2021), “Extreme Conditional Expectile Estimation in Heavy-Tailed Heteroscedastic Regression Models,” Annals of Statistics, 49, 3358–3382.
- Girard, S., Stupfler, G., and Usseglio-Carleve, A. (2022), “On Automatic Bias Reduction for Extreme Expectile Estimation,” Statistics and Computing, hal-03086048.
- Gneiting, T. (2011), “Making and Evaluating Point Forecasts,” Journal of the American Statistical Association, 106, 746–762. DOI: 10.1198/jasa.2011.r10138.
- Harezlak, J., Ruppert, D., and Wand, M. P. (2018), Semiparametric Regression with R, New York: Springer.
- Harezlak, J., Ruppert, D., and Wand, M. P. (2021), HRW: Datasets, Functions and Scripts for Semiparametric Regression Supporting Harezlak, Ruppert & Wand (2018), R package version 1.0–5.
- Hill, B. M. (1975), “A Simple General Approach to Inference about the Tail of a Distribution,” Annals of Statistics, 3, 1163–1174.
- Jiang, R., Hu, X., and Yu, K. (2021), “Single-Index Expectile Models for Estimating Conditional Value at Risk and Expected Shortfall,” Journal of Financial Econometrics, to appear. DOI: 10.1093/jjfinec/nbaa016.
- Kuan, C.-M., Yeh, J.-H., and Hsu, Y.-C. (2009), “Assessing Value at Risk with CARE, the Conditional Autoregressive Expectile models,” Journal of Econometrics, 150, 261–270.
- Manjunath, B. G., and Caeiro, F. (2013), evt0: Mean of Order p, Peaks Over Random Threshold Hill and High Quantile Estimates, R package version 1.1–3.
- McNeil, A. J., and Frey, R. (2000), “Estimation of Tail-Related Risk Measures for Heteroscedastic Financial Time Series: An Extreme Value Approach,” Journal of Empirical Finance, 7, 271–300.
- Mikosch, T., and Stărică, C. (2000), “Limit Theory for the Sample Autocorrelations and Extremes of a GARCH(1,1) Process,” Annals of Statistics, 28, 1427–1451.
- Newey, W. K., and Powell, J. L. (1987), “Asymmetric Least Squares Estimation and Testing,” Econometrica, 55, 819–847.
- Wand, M. P., Moler, C., and Ripley, B. (2021), KernSmooth: Functions for Kernel Smoothing Supporting Wand & Jones (1995), R package version 2.23–20.
- Weissman, I. (1978), “Estimation of Parameters and Large Quantiles Based on the k Largest Observations,” Journal of the American Statistical Association, 73, 812–815.
- Xie, S., Zhou, Y., and Wan, A. T. K. (2014), “A Varying-Coefficient Expectile Model for Estimating Value at Risk,” Journal of Business & Economic Statistics, 32, 576–592.
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