LEAST SQUARES AND ENTROPY AS PENALTY FUNCTIONS

dc.creatorPreckel, Paul V.
dc.date2017-04-01T17:49:44Z
dc.date.accessioned2026-07-09T04:01:57Z
dc.descriptionMathematical measures of entropy as defined by Shannon (1948) and Kullback and Leibler (1951) are currently in vogue in the field of econometrics, primarily due to the comprehensive work by Golan, Judge, and Miller (1996). In this paper, an alternative interpretation of the entropy measure as a penalty function over deviations is presented. Using this interpretation, a number of parallels are drawn with least squares estimators, and it is demonstrated that, with a minor modification of the traditional least squares estimator, both approaches may be applied to the general linear model. The advantages and disadvantages of each approach are discussed, and a philosophical approach to the selection of estimation technique is suggested.
dc.identifierdoi:10.22004/ag.econ.28625
dc.identifierhttps://ageconsearch.umn.edu/record/28625/files/sp98-16.pdf
dc.identifierhttp://ageconsearch.umn.edu/record/28625
dc.identifier.urihttp://hdl.handle.net/123456789/543799
dc.languageeng
dc.publisher
dc.sourcehttp://ageconsearch.umn.edu/record/28625
dc.titleLEAST SQUARES AND ENTROPY AS PENALTY FUNCTIONS
dc.typeText

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