convex elicitable
Convex Elicitation of Continuous Properties
Jessica Finocchiaro, Rafael Frongillo
Neural Information Processing Systems http://nips.cc/
- North America > United States > Colorado > Boulder County > Boulder (0.04)
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Convex Elicitation of Continuous Properties
Jessica Finocchiaro, Rafael Frongillo
Neural Information Processing Systems http://nips.cc/
- North America > United States > Colorado > Boulder County > Boulder (0.04)
- North America > United States > California > Alameda County > Berkeley (0.04)
- North America > Canada (0.04)
- Asia > Middle East > Jordan (0.04)
Convex Elicitation of Continuous Properties
Finocchiaro, Jessica, Frongillo, Rafael
A property or statistic of a distribution is said to be elicitable if it can be expressed as the minimizer of some loss function in expectation. Recent work shows that continuous real-valued properties are elicitable if and only if they are identifiable, meaning the set of distributions with the same property value can be described by linear constraints. From a practical standpoint, one may ask for which such properties do there exist convex loss functions. In this paper, in a finite-outcome setting, we show that in fact essentially every elicitable real-valued property can be elicited by a convex loss function. Our proof is constructive, and leads to convex loss functions for new properties.
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