The Generalized Multinomial Logit Model: Accounting for Scale and Coefficient Heterogeneity

The mixed or heterogeneous multinomial logit (MIXL) model has become popular in a number of fields, especially marketing, health economics, and industrial organization. In most applications of the model, the vector of consumer utility weights on product attributes is assumed to have a multivariate n...

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Veröffentlicht in:	Marketing science (Providence, R.I.) R.I.), 2010-05, Vol.29 (3), p.393-421
Hauptverfasser:	Fiebig, Denzil G., Keane, Michael P., Louviere, Jordan, Wasi, Nada
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Sprache:	eng
Schlagworte:	Accounting Approximation Cell phones choice experiments choice models Consumer behavior consumer heterogeneity Consumer preferences Consumers Credit cards Datasets Distribution Economic models Economic theory Logits Market segments Marketing Mixture models Modeling Monte Carlo method Multivariate analysis Parametric models Pizzas Population Product development Regression analysis Scale modeling Statistics Studies Taste Testing Utility functions Utility models
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description	The mixed or heterogeneous multinomial logit (MIXL) model has become popular in a number of fields, especially marketing, health economics, and industrial organization. In most applications of the model, the vector of consumer utility weights on product attributes is assumed to have a multivariate normal (MVN) distribution in the population. Thus, some consumers care more about some attributes than others, and the IIA property of multinomial logit (MNL) is avoided (i.e., segments of consumers will tend to switch among the subset of brands that possess their most valued attributes). The MIXL model is also appealing because it is relatively easy to estimate. Recently, however, some researchers have argued that the MVN is a poor choice for modelling taste heterogeneity. They argue that much of the heterogeneity in attribute weights is accounted for by a pure scale effect (i.e., across consumers, all attribute weights are scaled up or down in tandem). This implies that choice behaviour is simply more random for some consumers than others (i.e., holding attribute coefficients fixed, the scale of their error term is greater). This leads to a "scale heterogeneity" MNL model (S-MNL). Here, we develop a generalized multinomial logit model (G-MNL) that nests S-MNL and MIXL. By estimating the S-MNL, MIXL, and G-MNL models on 10 data sets, we provide evidence on their relative performance. We find that models that account for scale heterogeneity (i.e., G-MNL or S-MNL) are preferred to MIXL by the Bayes and consistent Akaike information criteria in all 10 data sets. Accounting for scale heterogeneity enables one to account for "extreme" consumers who exhibit nearly lexicographic preferences, as well as consumers who exhibit very "random" behaviour (in a sense we formalize below).
doi_str_mv	10.1287/mksc.1090.0508
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This leads to a "scale heterogeneity" MNL model (S-MNL). Here, we develop a generalized multinomial logit model (G-MNL) that nests S-MNL and MIXL. By estimating the S-MNL, MIXL, and G-MNL models on 10 data sets, we provide evidence on their relative performance. We find that models that account for scale heterogeneity (i.e., G-MNL or S-MNL) are preferred to MIXL by the Bayes and consistent Akaike information criteria in all 10 data sets. 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This leads to a "scale heterogeneity" MNL model (S-MNL). Here, we develop a generalized multinomial logit model (G-MNL) that nests S-MNL and MIXL. By estimating the S-MNL, MIXL, and G-MNL models on 10 data sets, we provide evidence on their relative performance. We find that models that account for scale heterogeneity (i.e., G-MNL or S-MNL) are preferred to MIXL by the Bayes and consistent Akaike information criteria in all 10 data sets. Accounting for scale heterogeneity enables one to account for "extreme" consumers who exhibit nearly lexicographic preferences, as well as consumers who exhibit very "random" behaviour (in a sense we formalize below).</description><subject>Accounting</subject><subject>Approximation</subject><subject>Cell phones</subject><subject>choice experiments</subject><subject>choice models</subject><subject>Consumer behavior</subject><subject>consumer heterogeneity</subject><subject>Consumer preferences</subject><subject>Consumers</subject><subject>Credit cards</subject><subject>Datasets</subject><subject>Distribution</subject><subject>Economic models</subject><subject>Economic theory</subject><subject>Logits</subject><subject>Market segments</subject><subject>Marketing</subject><subject>Mixture models</subject><subject>Modeling</subject><subject>Monte Carlo method</subject><subject>Multivariate analysis</subject><subject>Parametric models</subject><subject>Pizzas</subject><subject>Population</subject><subject>Product development</subject><subject>Regression analysis</subject><subject>Scale modeling</subject><subject>Statistics</subject><subject>Studies</subject><subject>Taste</subject><subject>Testing</subject><subject>Utility functions</subject><subject>Utility models</subject><issn>0732-2399</issn><issn>1526-548X</issn><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>2010</creationdate><recordtype>article</recordtype><sourceid>X2L</sourceid><sourceid>N95</sourceid><recordid>eNqFkk2LFDEQhhtRcFy9ehMaPXixx3x0uhNvw6C7yiwenIPgIWTTlZ6M3clskhbGX2_akfWDAQlVFZKnXqqKKoqnGC0x4e3r8WvUS4wEWiKG-L1igRlpKlbzz_eLBWopqQgV4mHxKMY9QqgliC-KL9sdlJfgIKjBfoeuvJ6GZJ0frRrKje9tKq99B8ObcqW1n1z-60vjQ_lJqwFK5bpy7cEYqy24VF5BguD7rGfT8XHxwKghwpNf8aLYvnu7XV9Vm4-X79erTaUb0aSKMy06TG6I6RRnBuPaNKiumea8o6xlXLCmxrRjqAPTampqLYBwgVjLCaP0onh5kj0EfztBTHK0UcMwKAd-ipLnObSc8pl8_g-591NwuTbJCG4aXGOcoRcnqM8NSuuMT0HpWVKuCOGk5py1marOUP1pkN6Bsfn5L355hs-ng9Hqswmv_ki4maJ1ELOLtt-l2KspxrP6OvgYAxh5CHZU4SgxkvN6yHk95Lwecl6PnPDhlBDgAPqOtm704Sf6TVJFRHbH-YKyDFU2G812mKOgsiZY7tKYxZ6dxPYx-XAnVqMG5ek3v6c1Nx7G-L_ifgDA8NxC</recordid><startdate>20100501</startdate><enddate>20100501</enddate><creator>Fiebig, Denzil G.</creator><creator>Keane, Michael P.</creator><creator>Louviere, Jordan</creator><creator>Wasi, Nada</creator><general>INFORMS</general><general>Institute for Operations Research and the Management Sciences (INFORMS)</general><general>Institute for Operations Research and the Management Sciences</general><scope>DKI</scope><scope>X2L</scope><scope>AAYXX</scope><scope>CITATION</scope><scope>N95</scope><scope>XI7</scope><scope>8BJ</scope><scope>FQK</scope><scope>JBE</scope></search><sort><creationdate>20100501</creationdate><title>The Generalized Multinomial Logit Model: Accounting for Scale and Coefficient Heterogeneity</title><author>Fiebig, Denzil G. ; Keane, Michael P. ; Louviere, Jordan ; Wasi, Nada</author></sort><facets><frbrtype>5</frbrtype><frbrgroupid>cdi_FETCH-LOGICAL-c696t-85c9d12b2fda85f114f60445c88d35758956413d50def7c3f4c9e28905782533</frbrgroupid><rsrctype>articles</rsrctype><prefilter>articles</prefilter><language>eng</language><creationdate>2010</creationdate><topic>Accounting</topic><topic>Approximation</topic><topic>Cell phones</topic><topic>choice experiments</topic><topic>choice models</topic><topic>Consumer behavior</topic><topic>consumer heterogeneity</topic><topic>Consumer preferences</topic><topic>Consumers</topic><topic>Credit cards</topic><topic>Datasets</topic><topic>Distribution</topic><topic>Economic models</topic><topic>Economic theory</topic><topic>Logits</topic><topic>Market segments</topic><topic>Marketing</topic><topic>Mixture models</topic><topic>Modeling</topic><topic>Monte Carlo method</topic><topic>Multivariate analysis</topic><topic>Parametric models</topic><topic>Pizzas</topic><topic>Population</topic><topic>Product development</topic><topic>Regression analysis</topic><topic>Scale modeling</topic><topic>Statistics</topic><topic>Studies</topic><topic>Taste</topic><topic>Testing</topic><topic>Utility functions</topic><topic>Utility models</topic><toplevel>peer_reviewed</toplevel><toplevel>online_resources</toplevel><creatorcontrib>Fiebig, Denzil G.</creatorcontrib><creatorcontrib>Keane, Michael P.</creatorcontrib><creatorcontrib>Louviere, Jordan</creatorcontrib><creatorcontrib>Wasi, Nada</creatorcontrib><collection>RePEc IDEAS</collection><collection>RePEc</collection><collection>CrossRef</collection><collection>Gale Business: Insights</collection><collection>Business Insights: Essentials</collection><collection>International Bibliography of the Social Sciences (IBSS)</collection><collection>International Bibliography of the Social Sciences</collection><collection>International Bibliography of the Social Sciences</collection><jtitle>Marketing science (Providence, R.I.)</jtitle></facets><delivery><delcategory>Remote Search Resource</delcategory><fulltext>fulltext</fulltext></delivery><addata><au>Fiebig, Denzil G.</au><au>Keane, Michael P.</au><au>Louviere, Jordan</au><au>Wasi, Nada</au><format>journal</format><genre>article</genre><ristype>JOUR</ristype><atitle>The Generalized Multinomial Logit Model: Accounting for Scale and Coefficient Heterogeneity</atitle><jtitle>Marketing science (Providence, R.I.)</jtitle><date>2010-05-01</date><risdate>2010</risdate><volume>29</volume><issue>3</issue><spage>393</spage><epage>421</epage><pages>393-421</pages><issn>0732-2399</issn><eissn>1526-548X</eissn><coden>MARSE5</coden><abstract>The mixed or heterogeneous multinomial logit (MIXL) model has become popular in a number of fields, especially marketing, health economics, and industrial organization. In most applications of the model, the vector of consumer utility weights on product attributes is assumed to have a multivariate normal (MVN) distribution in the population. Thus, some consumers care more about some attributes than others, and the IIA property of multinomial logit (MNL) is avoided (i.e., segments of consumers will tend to switch among the subset of brands that possess their most valued attributes). The MIXL model is also appealing because it is relatively easy to estimate. Recently, however, some researchers have argued that the MVN is a poor choice for modelling taste heterogeneity. They argue that much of the heterogeneity in attribute weights is accounted for by a pure scale effect (i.e., across consumers, all attribute weights are scaled up or down in tandem). This implies that choice behaviour is simply more random for some consumers than others (i.e., holding attribute coefficients fixed, the scale of their error term is greater). This leads to a "scale heterogeneity" MNL model (S-MNL). Here, we develop a generalized multinomial logit model (G-MNL) that nests S-MNL and MIXL. By estimating the S-MNL, MIXL, and G-MNL models on 10 data sets, we provide evidence on their relative performance. We find that models that account for scale heterogeneity (i.e., G-MNL or S-MNL) are preferred to MIXL by the Bayes and consistent Akaike information criteria in all 10 data sets. Accounting for scale heterogeneity enables one to account for "extreme" consumers who exhibit nearly lexicographic preferences, as well as consumers who exhibit very "random" behaviour (in a sense we formalize below).</abstract><cop>Linthicum</cop><pub>INFORMS</pub><doi>10.1287/mksc.1090.0508</doi><tpages>29</tpages></addata></record>
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subjects	Accounting Approximation Cell phones choice experiments choice models Consumer behavior consumer heterogeneity Consumer preferences Consumers Credit cards Datasets Distribution Economic models Economic theory Logits Market segments Marketing Mixture models Modeling Monte Carlo method Multivariate analysis Parametric models Pizzas Population Product development Regression analysis Scale modeling Statistics Studies Taste Testing Utility functions Utility models
title	The Generalized Multinomial Logit Model: Accounting for Scale and Coefficient Heterogeneity
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