References
- Aigner, D. J., T. Amemiya, and D. J. Poirier. 1976. On the estimation of production frontiers: Maximum likelihood estimation of the parameters of a discontinuous density function. International Economic Review 17 (2):377–96.
- Artzner, P., F. Delbaen, J.-M. Eber, and D. Heath. 1999. Coherent measures of risk. Mathematical Finance 9 (3):203–28.
- Baysal, R. E., and J. Staum. 2008. Empirical likelihood for value-at-risk and expected shortfall. The Journal of Risk 11 (1):3–32.
- Breckling, J., and R. Chambers. 1988. M-quantiles. Biometrika 75 (4):761–71.
- Chen, S. X., and P. Hall. 1993. Smoothed empirical likelihood confidence intervals for quantiles. The Annals of Statistics 21 (3):1166–81.
- De Rossi, G., and A. Harvey. 2009. Quantiles, expectiles and splines. Journal of Econometrics 152 (2):179–85.
- Dhaene, J., S. Vanduffel, M. J. Goovaerts, R. Kaas, Q. Tang, and D. Vyncke. 2006. Risk measures and comonotonicity: A review. Stochastic Models 22 (4):573–606.
- Efron, B. 1991. Regression percentiles using asymmetric squared error loss. Statistica Sinica 1:93–125.
- Eilers, P. H. 2013. Discussion: The beauty of expectiles. Statistical Modelling 13 (4):317–22.
- Einmahl, J. H. J., and J. Segers. 2009. Maximum empirical likelihood estimation of the spectral measure of an extreme-value distribution. The Annals of Statistics 37 (5B):2953–89.
- Furman, E., and R. Zitikis. 2008. Weighted premium calculation principles. Insurance: Mathematics and Economics 42 (1):459–65.
- Holzmann, H., and B. Klar. 2016. Expectile asymptotics. Electronic Journal of Statistics 10 (2):2355–71.
- Jones, M. C. 1994. Expectiles and M-quantiles are quantiles. Statistics & Probability Letters 20 (2):149–53.
- Kim, M., and S. Lee. 2016. Nonlinear expectile regression with application to value-at-risk and expected shortfall estimation. Computational Statistics & Data Analysis 94:1–19.
- Kratschmer, V., and H. Zahle. 2017. Statistical inference for expectile-based risk measures. Scandinavian Journal of Statistics 44 (2):425–54.
- Kuan, C.-M., J.-H. Yeh, and Y.-C. Hsu. 2009. Assessing value at risk with CARE, the conditional autoregressive expectile models. Journal of Econometrics 150 (2):261–70.
- Laeven, R. J., and M. J. Goovaerts. 2008. Premium calculation and insurance pricing. In Encyclopedia of quantitative risk analysis and assessment, ed. E. L. Melnick and B. S. Everitt, 1302–14. Hoboken, NJ: John Wiley & Sons.
- Newey, W. K., and J. L. Powell. 1987. Asymmetric least squares estimation and testing. Econometrica 55 (4):819–47.
- Owen, A. 1990. Empirical likelihood ratio confidence regions. The Annals of Statistics 18 (1):90–120.
- Peng, L., X. Wang, and Y. Zheng. 2015. Empirical likelihood inference for haezendonck-goovaerts risk measure. European Actuarial Journal 5 (2):427–45.
- Qin, J., and J. Lawless. 1994. Empirical likelihood and general estimating equations. The Annals of Statistics 22 (1):300–25.
- Schnabel, S. K., and P. H. Eilers. 2013. A location-scale model for non-crossing expectile curves. Stat 2 (1):171–83.
- Schnabel, S. K., and P. H. C. Eilers. 2009. Optimal expectile smoothing. Computational Statistics & Data Analysis 53 (12):4168–77.
- Shorack, G., and J. Wellner. 2009. Empirical processes with applications to statistics (Classics in Applied Mathematics). Philadelphia, PA: Society for Industrial and Applied Mathematics.
- Taylor, J. W. 2008. Estimating value at risk and expected shortfall using expectiles. Journal of Financial Econometrics 6 (2):231–52.
- Waltrup, L. S., F. Sobotka, T. Kneib, and G. Kauermann. 2015. Expectile and quantile regression-david and goliath? Statistical Modelling 15 (5):433–56.
- Wang, S. S. 1996. Premium calculation by transforming the layer premium density. ASTIN Bulletin 26:C71–92.
- Wang, S. S. 2000. A class of distortion operators for pricing financial and insurance risks. The Journal of Risk and Insurance 67 (1):15–36.
- Wang, S. S., and V. R. Young. 1998. Risk-adjusted credibility premiums using distorted probabilities. Scandinavian Actuarial Journal 1998 (2):143–65.
- Wang, Y., S. Wang, and K. K. Lai. 2011. Measuring financial risk with generalized asymmetric least squares regression. Applied Soft Computing 11 (8):5793–800.
- Xie, S., Y. Zhou, and A. T. K. Wan. 2014. A varying-coefficient expectile model for estimating value at risk. Journal of Business & Economic Statistics 32 (4):576–92.
- Yaari, M. E. 1987. The dual theory of choice under risk. Econometrica 55 (1):95–115.
- Zheng, Y., and W. Cui. 2014. Optimal reinsurance with premium constraint under distortion risk measures. Insurance: Mathematics and Economics 59:109–120.
- Ziegel, J. F. 2016. Coherence and elicitability. Mathematical Finance 26 (4):901–18.
- Zwingmann, T., and H. Holzmann. 2017. Weak convergence of quantile and expectile processes under general assumptions. arXiv:1706.04668 [math, stat]. arXiv:1706.04668.