Mincer–Zarnowitz quantile and expectile regressions for forecast evaluations under aysmmetric loss functions

Forecasts are pervasive in all areas of applications in business and daily life. Hence evaluating the accuracy of a forecast is important for both the generators and consumers of forecasts. There are two aspects in forecast evaluation: (a) measuring the accuracy of past forecasts using some summary statistics, and (b) testing the optimality properties of the forecasts through some diagnostic tests. On measuring the accuracy of a past forecast, this paper illustrates that the summary statistics used should match the loss function that was used to generate the forecast. If there is strong evidence that an asymmetric loss function has been used in the generation of a forecast, then a summary statistic that corresponds to that asymmetric loss function should be used in assessing the accuracy of the forecast instead of the popular root mean square error or mean absolute error. On testing the optimality of the forecasts, it is demonstrated how the quantile regressions set in the prediction–realization framework of Mincer and Zarnowitz (in J. Mincer (Ed.), Economic Forecasts and Expectations: Analysis of Forecasting Behavior and Performance (pp. 14–20), 1969) can be used to recover the unknown parameter that controls the potentially asymmetric loss function used in generating the past forecasts. Finally, the prediction–realization framework is applied to the Federal Reserve's economic growth forecast and forecast sharing in a PC manufacturing supply chain. It is found that the Federal Reserve values overprediction approximately 1.5 times more costly than underprediction. It is also found that the PC manufacturer weighs positive forecast errors (under forecasts) about four times as costly as negative forecast errors (over forecasts).

[1]  Andrew A. Weiss,et al.  Estimating Time Series Models Using the Relevant Cost Function , 1996 .

[2]  Stephen W. Pruitt,et al.  Capital Budgeting Forecast Biases: Evidence from the Fortune 500 , 1987 .

[3]  M. Hashem Pesaran,et al.  Decision‐Based Methods for Forecast Evaluation , 2007 .

[4]  Roger Koenker,et al.  Quantile Autoregression , 2006 .

[5]  R. Chambers,et al.  Microsimulation of Business Performance , 2000 .

[6]  Howard Raiffa,et al.  Applied Statistical Decision Theory. , 1961 .

[7]  R. Koenker Quantile Regression: Name Index , 2005 .

[8]  James W. Taylor,et al.  Forecasting daily supermarket sales using exponentially weighted quantile regression , 2007, Eur. J. Oper. Res..

[9]  J. S. Verkade,et al.  Estimation of Predictive Hydrological Uncertainty using Quantile Regression , 2010 .

[10]  Kurt F. Lewis,et al.  Empirical Bayesian Density Forecasting in Iowa and Shrinkage for the Monte Carlo Era , 2006, SSRN Electronic Journal.

[11]  Francis X. Diebold,et al.  The Rodney L. White Center for Financial Research Financial Asset Returns, Direction-of-Change Forecasting and Volatility , 2003 .

[12]  Christian C. P. Wolff,et al.  Foreign Exchange Rate Expectations: Survey and Synthesis , 2008 .

[13]  Andrew J. Patton,et al.  Properties of Optimal Forecasts under Asymmetric Loss and Nonlinearity , 2007 .

[14]  John Bjørnar Bremnes,et al.  Probabilistic wind power forecasts using local quantile regression , 2004 .

[15]  Takatoshi Ito Foreign Exchange Rate Expectations: Micro Survey Data , 1988 .

[16]  Linda Schulze Waltrup,et al.  Expectile and quantile regression—David and Goliath? , 2015 .

[17]  Michael Jefferson,et al.  Exploring the production of natural gas through the lenses of the ACEGES model , 2014 .

[18]  A. Zellner Bayesian Estimation and Prediction Using Asymmetric Loss Functions , 1986 .

[19]  Hau L. Lee,et al.  Information distortion in a supply chain: the bullwhip effect , 1997 .

[20]  J. Mincer,et al.  Economic Forecasts and Expectations: Analysis of Forecasting Behavior and Performance , 1970 .

[21]  T. Gneiting Quantiles as optimal point forecasts , 2011 .

[22]  Clive W. J. Granger Prediction with a generalized cost of error function , 2001 .

[23]  Roger N. Waud Asymmetric Policymaker Utility Functions and Optimal Policy Under Uncertainty , 1975 .

[24]  A. Timmermann,et al.  Economic Forecasting , 2007 .

[25]  R. Koenker,et al.  Regression Quantiles , 2007 .

[26]  Xiaohong Chen Chapter 76 Large Sample Sieve Estimation of Semi-Nonparametric Models , 2007 .

[27]  F. Diebold,et al.  Optimal Prediction Under Asymmetric Loss , 1994, Econometric Theory.

[28]  C. Capistrán Bias in Federal Reserve Inflation Forecasts: Is the Federal Reserve Irrational or Just Cautious? , 2005 .

[29]  Christophe Sarran,et al.  Forecasting peak asthma admissions in London: an application of quantile regression models , 2012, International Journal of Biometeorology.

[30]  Nate Silver,et al.  The signal and the noise : why so many predictions fail but some don't , 2012 .

[31]  Deepak Kumar Subedi,et al.  Signal and Noise: Why So Many Predictions Fail – but Some Don't , 2013 .

[32]  Christopher P. Chambers Ordinal aggregation and quantiles , 2007, J. Econ. Theory.

[33]  T. Gneiting Making and Evaluating Point Forecasts , 2009, 0912.0902.

[34]  P. Friederichs,et al.  Statistical Downscaling of Extreme Precipitation Events Using Censored Quantile Regression , 2007 .

[35]  Charles F. Manski,et al.  Ordinal utility models of decision making under uncertainty , 1988 .

[36]  R. Koenker Discussion: Living beyond our means , 2013 .

[37]  Stephen Taylor,et al.  Forecasting Economic Time Series , 1979 .

[38]  Henrik Madsen,et al.  Using quantile regression to extend an existing wind power forecasting system with probabilistic forecasts , 2006 .

[39]  Morris A. Cohen,et al.  Measuring Imputed Cost in the Semiconductor Equipment Supply Chain , 2003, Manag. Sci..

[40]  K. West,et al.  A Utility Based Comparison of Some Models of Exchange Rate Volatility , 1992 .

[41]  T. Kneib Beyond mean regression , 2013 .

[42]  Roy Batchelor,et al.  Rationality testing under asymmetric loss , 1998 .

[43]  M. Manera,et al.  Causality and predictability in distribution: The ethanol–food price relation revisited , 2014 .

[44]  Gerald S. Rogers,et al.  Mathematical Statistics: A Decision Theoretic Approach , 1967 .

[45]  C. Granger,et al.  Economic and Statistical Measures of Forecast Accuracy , 1999 .

[46]  M. Rostek Quantile Maximization in Decision Theory , 2009 .

[47]  Allan Timmermann,et al.  Estimation and Testing of Forecast Rationality under Flexible Loss , 2005 .

[48]  Ireneous N. Soyiri,et al.  The Use of Quantile Regression to Forecast Higher Than Expected Respiratory Deaths in a Daily Time Series: A Study of New York City Data 1987-2000 , 2013, PloS one.

[49]  W. Newey,et al.  Asymmetric Least Squares Estimation and Testing , 1987 .

[50]  Massimiliano Marcellino,et al.  Fiscal forecasting: The track record of the IMF, OECD and EC , 2001 .

[51]  Clive W. J. Granger,et al.  Outline of forecast theory using generalized cost functions , 1999 .

[52]  David E. Runkle,et al.  Testing the Rationality of Price Forecasts: New Evidence from Panel Data , 1990 .

[53]  Jianqing Fan,et al.  Quantile autoregression. Commentary , 2006 .