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MOR
2010
2010
A Geometric Proof of Calibration
We provide yet another proof of the existence of calibrated forecasters; it has two merits. First, it is valid for an arbitrary finite number of outcomes. Second, it is short and simple and it follows from a direct application of Blackwell's approachability theorem to carefully chosen vector-valued payoff function and convex target set. Our proof captures the essence of existing proofs based on approachability (e.g., the proof by Foster [1999] in case of binary outcomes) and highlights the intrinsic connection between approachability and calibration. JEL codes: C72, C73
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| Added | 20 May 2011 |
| Updated | 20 May 2011 |
| Type | Journal |
| Year | 2010 |
| Where | MOR |
| Authors | Shie Mannor, Gilles Stoltz |
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