Calibrated Probabilistic Mesoscale Weather Field Forecasting

Probabilistic weather forecasting consists of finding a joint probability distribution for future weather quantities or events. It is typically done by using a numerical weather prediction model, perturbing the inputs to the model in various ways, and running the model for each perturbed set of inputs. The result is then viewed as an ensemble of forecasts, taken to be a sample from the joint probability distribution of the future weather quantities of interest. This is typically not feasible for mesoscale weather prediction carried out locally by organizations without the vast data and computing resources of national weather centers. Instead, we propose a simpler method that breaks with much previous practice by perturbing the outputs, or deterministic forecasts, from the model. Forecast errors are modeled using a geostatistical model, and ensemble members are generated by simulating realizations of the geostatistical model. The method is applied to 48-hour mesoscale forecasts of temperature in the North American Pacific Northwest between 2000 and 2002. The resulting forecast intervals turn out to be empirically well calibrated for individual meteorological quantities, to be sharper than those obtained from approximate climatology, and to be consistent with aspects of the spatial correlation structure of the observations.

[1]  Lewis F. Richardson,et al.  Weather Prediction by Numerical Process , 1922 .

[2]  E. Epstein,et al.  Stochastic dynamic prediction , 1969 .

[3]  C. Leith Theoretical Skill of Monte Carlo Forecasts , 1974 .

[4]  A. H. Murphy,et al.  Probabilistic temperature forecasts: The case for an operational program , 1979 .

[5]  A. Raftery,et al.  Space-time modeling with long-memory dependence: assessing Ireland's wind-power resource. Technical report , 1987 .

[6]  R. Daley Atmospheric Data Analysis , 1991 .

[7]  Noel A Cressie,et al.  Statistics for Spatial Data. , 1992 .

[8]  Eugenia Kalnay,et al.  Ensemble Forecasting at NMC: The Generation of Perturbations , 1993 .

[9]  D. Stensrud,et al.  Mesoscale Convective Systems in Weakly Forced Large-Scale Environments. Part II: Generation of a Mesoscale Initial Condition , 1994 .

[10]  D. Stensrud,et al.  Mesoscale Convective Systems in Weakly Forced Large-Scale Environments. Part III: Numerical Simulations and Implications for Operational Forecasting , 1994 .

[11]  A. Wood,et al.  Simulation of Stationary Gaussian Processes in [0, 1] d , 1994 .

[12]  Jeffrey L. Anderson A Method for Producing and Evaluating Probabilistic Forecasts from Ensemble Model Integrations , 1996 .

[13]  P. L. Houtekamer,et al.  A System Simulation Approach to Ensemble Prediction , 1996 .

[14]  C. R. Dietrich,et al.  Fast and Exact Simulation of Stationary Gaussian Processes through Circulant Embedding of the Covariance Matrix , 1997, SIAM J. Sci. Comput..

[15]  M. Ehrendorfer Vorhersage der Unsicherheit numerischer Wetterprognosen: eine Übersicht , 1997 .

[16]  Thomas M. Hamill,et al.  Verification of Eta–RSM Short-Range Ensemble Forecasts , 1997 .

[17]  P. Houtekamer,et al.  Data Assimilation Using an Ensemble Kalman Filter Technique , 1998 .

[18]  A. T. A. Wood,et al.  Simulation of stationary Gaussian vector fields , 1999, Stat. Comput..

[19]  T. Gneiting Correlation functions for atmospheric data analysis , 1999 .

[20]  J. Chilès,et al.  Geostatistics: Modeling Spatial Uncertainty , 1999 .

[21]  D. Nychka Challenges in Understanding the Atmosphere , 2000 .

[22]  T. Hamill,et al.  A Comparison of Probabilistic Forecasts from Bred, Singular-Vector, and Perturbed Observation Ensembles , 2000 .

[23]  T. Palmer Predicting uncertainty in forecasts of weather and climate , 2000 .

[24]  D. Stensrud,et al.  Evaluation of a Short-Range Multimodel Ensemble System , 2001 .

[25]  K. Droegemeier,et al.  Objective Verification of the SAMEX ’98 Ensemble Forecasts , 2001 .

[26]  P. Houtekamer,et al.  A Sequential Ensemble Kalman Filter for Atmospheric Data Assimilation , 2001 .

[27]  R. Kohn,et al.  Statistical Correction of a Deterministic Numerical Weather Prediction Model , 2001 .

[28]  A. Raftery,et al.  Model Validation and Spatial Interpolation by Combining Observations with Outputs from Numerical Models via Bayesian Melding , 2001 .

[29]  A. O'Hagan,et al.  Bayesian calibration of computer models , 2001 .

[30]  M. Schlather Simulation and Analysis of Random Fields , 2001 .

[31]  Peter J. Diggle,et al.  Simulation and Analysis of Random , 2001 .

[32]  E. Grimit,et al.  Initial Results of a Mesoscale Short-Range Ensemble Forecasting System over the Pacific Northwest , 2002 .

[33]  N. Gustafsson Statistical Issues in Weather Forecasting * , 2002 .

[34]  Leonard A. Smith,et al.  Combining dynamical and statistical ensembles , 2003 .

[35]  A. Raftery,et al.  Using Bayesian Model Averaging to Calibrate Forecast Ensembles , 2005 .

[36]  M. Goldstein Bayes Linear Analysis , 2006 .