|
|
|
|
||||
|
||||
Some Decision Theoretic Generalizations of Information MeasuresCraig A. FriedmanStandard & Poor's - Quantitative Analytics Jinggang HuangStandard & Poor's - Quantitative Analytics Sven SandowStandard & Poor's - Quantitative Analytics December 6, 2005 Abstract: We review a decision theoretic, i.e., utility-based, motivation for entropy and Kullback-Leibler relative entropy, the natural generalizations that follow, and various properties of these generalized quantities. We then consider these generalized quantities in an easily interpreted special case. We show that the resulting quantities, share many of the properties of entropy and relative entropy, such as the data processing inequality and the second law of thermodynamics. We formulate an important statistical learning problem - probability estimation - in terms of a generalized relative entropy. The solution of this problem reflects general risk preferences via the utility function; moreover, the solution is optimal in a sense of robust absolute performance.
Number of Pages in PDF File: 32 Keywords: Generalized Entropy, Generalized Kullback-Leibler Relative Entropy, Decision Theory, Expected Utility, Horse Race, Tsallis Entropy, Statistical Learning, Probability Estimation, Risk Neutral Pricing Measure working papers seriesDate posted: November 1, 2005Suggested CitationContact Information
|
|
||||||||||||||||||
© 2013 Social Science Electronic Publishing, Inc. All Rights Reserved.
FAQ
Terms of Use
Privacy Policy
Copyright
This page was processed by apollo4 in 0.360 seconds
