2013
DOI: 10.1920/wp.cem.2013.0313
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Estimating demand for differentiated products with error in market shares

Abstract: In this paper we introduce a new approach to estimating differentiated product demand system that allows for error in market shares as measures of choice probabilities. In particular, our approach allows for products with zero sales in the data, which is a frequent phenomenon that arises in product differentiated markets but lies outside the scope of existing demand estimation techniques. Although we find that error in market shares generally undermine the standard point identification of discrete choice model… Show more

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Cited by 37 publications
(39 citation statements)
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“…The test in (4.14) is not part of the tests discussed in Bugni, Canay, and Shi (2015) but has recently been used for a different testing problem in Gandhi, Lu, and Shi (2013). By construction,ĉ MR n (λ 1 − α) ≤ĉ PR n (λ 1 − α), and thus…”
Section: Power Advantage Over Subsampling Testsmentioning
confidence: 99%
“…The test in (4.14) is not part of the tests discussed in Bugni, Canay, and Shi (2015) but has recently been used for a different testing problem in Gandhi, Lu, and Shi (2013). By construction,ĉ MR n (λ 1 − α) ≤ĉ PR n (λ 1 − α), and thus…”
Section: Power Advantage Over Subsampling Testsmentioning
confidence: 99%
“…is not part of the tests discussed in Bugni et al (2014) but has recently been used for a different testing problem in Gandhi et al (2013). By construction,ĉ…”
Section: Power Advantage Over Subsampling Testsmentioning
confidence: 99%
“…The range of this mapping excludes some distributions of (s, X, Z); for instance, distributions in which some of the market shares take zero values with non-zero probability cannot be generated by our model, due to the multinomial logit structure. See Gandhi, Lu, and Shi (2013) for additional discussion of estimating discrete-choice demand models when some of the products are observed to have zero market shares.…”
Section: Identificationmentioning
confidence: 99%