Proper local scoring rules

Matthew Parry; A. Philip Dawid; Steffen L. Lauritzen

doi:10.1214/12-AOS971

Proper local scoring rules

Matthew Parry, A. Philip Dawid, Steffen L. Lauritzen

48 Citations (Scopus)

Abstract

We investigate proper scoring rules for continuous distributions on the real line. It is known that the log score is the only such rule that depends on the quoted density only through its value at the outcome that materializes. Here we allow further dependence on a finite number m of derivatives of the density at the outcome, and describe a large class of such m-local proper scoring rules: these exist for all even m but no odd m. We further show that for m ≥ 2 all such m-local rules can be computed without knowledge of the normalizing constant of the distribution.

Original language	English
Journal	Annals of Statistics
Volume	40
Issue number	1
Pages (from-to)	561-592
Number of pages	32
ISSN	0090-5364
DOIs	https://doi.org/10.1214/12-AOS971
Publication status	Published - Feb 2012
Externally published	Yes

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AU - Dawid, A. Philip

AU - Lauritzen, Steffen L.

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N2 - We investigate proper scoring rules for continuous distributions on the real line. It is known that the log score is the only such rule that depends on the quoted density only through its value at the outcome that materializes. Here we allow further dependence on a finite number m of derivatives of the density at the outcome, and describe a large class of such m-local proper scoring rules: these exist for all even m but no odd m. We further show that for m ≥ 2 all such m-local rules can be computed without knowledge of the normalizing constant of the distribution.

AB - We investigate proper scoring rules for continuous distributions on the real line. It is known that the log score is the only such rule that depends on the quoted density only through its value at the outcome that materializes. Here we allow further dependence on a finite number m of derivatives of the density at the outcome, and describe a large class of such m-local proper scoring rules: these exist for all even m but no odd m. We further show that for m ≥ 2 all such m-local rules can be computed without knowledge of the normalizing constant of the distribution.

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DO - 10.1214/12-AOS971

M3 - Journal article

SN - 0090-5364

VL - 40

SP - 561

EP - 592

JO - Annals of Statistics

JF - Annals of Statistics

IS - 1

ER -

Proper local scoring rules

Abstract

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