论文信息 - Forecast Aggregation

Forecast Aggregation

Bayesian experts with a common prior that are exposed to different evidence possibly make contradicting probabilistic forecasts. A policy maker who receives the forecasts must aggregate them in the best way possible. This is a challenge whenever the policy maker is not familiar with the prior nor the model and evidence available to the experts. We propose a model of non-Bayesian forecast aggregation and adapt the notion of regret as a means for evaluating the policy maker's performance. Whenever experts are Blackwell ordered taking a weighted average of the two forecasts, the weight of which is proportional to its precision (the reciprocal of the variance), is optimal. The resulting regret is equal 1/8(5√ 5-11) approx 0.0225425, which is 3 to 4 times better than naive approaches such as choosing one expert at random or taking the non-weighted average.

[1] J. Geanakoplos,et al. We Can't Disagree Forever , 1982 .

[2] Nabil I. Al-Najjar,et al. Comparative Testing of Experts , 2006 .

[3] D. Blackwell. Equivalent Comparisons of Experiments , 1953 .

[4] David K. Levine. Simple Adaptive Strategies: From Regret-Matching to Uncoupled Dynamics, Sergiu Hart, Andreu Mas-Colell. World Scientific Publishing Company, Singapore (2013) , 2014, Games Econ. Behav..

[5] M. Degroot. Reaching a Consensus , 1974 .

[6] M. Sion. On general minimax theorems , 1958 .

[7] Alvaro Sandroni. Do markets favor agents able to make accurate predictions , 2000 .

[8] G. Brier. VERIFICATION OF FORECASTS EXPRESSED IN TERMS OF PROBABILITY , 1950 .

[9] Gábor Lugosi,et al. Prediction, learning, and games , 2006 .

[10] Colin Stewart,et al. Testing Multiple Forecasters , 2007 .

[11] Robert J. Aumann,et al. Repeated Games with Incomplete Information , 1995 .

[12] James Hannan,et al. 4. APPROXIMATION TO RAYES RISK IN REPEATED PLAY , 1958 .