Help
Cart
Skip main navigation

Available Issues

April 10, 2013 - June 5, 2026

Available Issues

April 10, 2013 - June 5, 2026

A Representative Consumer Model in Data-Driven Multiproduct Pricing Optimization

Published Online:20 Jan 2022https://doi.org/10.1287/mnsc.2021.4182

References

  • Akçay Y, Natarajan HP, Xu SH (2010) Joint dynamic pricing of multiple perishable products under consumer choice. Management Sci. 56(8):1345–1361.LinkGoogle Scholar
  • Allen R, Rehbeck J (2019) Identification with additively separable heterogeneity. Econometrica 87(3):1021–1054.CrossrefGoogle Scholar
  • Alptekinoğlu A, Semple JH (2016) The exponomial choice model: A new alternative for assortment and price optimization. Oper. Res. 64(1):79–93.LinkGoogle Scholar
  • Anderson SP, De Palma A, Thisse J-F (1992) Discrete Choice Theory of Product Differentiation (MIT Press, Cambridge, MA).CrossrefGoogle Scholar
  • Bagnoli M, Bergstrom T (2005) Log-concave probability and its applications. Econom. Theory 26(2):445–469.CrossrefGoogle Scholar
  • Bell MG (1995) Alternatives to dial’s logit assignment algorithm. Transportation Res. Part B Methodological 29(4):287–295.CrossrefGoogle Scholar
  • Ben-Akiva M, Lerman SR (2018) Discrete Choice Analysis: Theory and Application to Travel Demand (MIT Press, Cambridge, MA).Google Scholar
  • Berry S, Levinsohn J, Pakes A (1995) Automobile prices in market equilibrium. Econometrica 63(4):841–890.CrossrefGoogle Scholar
  • Bunch DS (1987) Maximum likelihood estimation of probabilistic choice models. SIAM J. Sci. Statist. Comput. 8(1):56–70.CrossrefGoogle Scholar
  • Chen X, Diakonikolas I, Paparas D, Sun X, Yannakakis M (2018) The complexity of optimal multidimensional pricing for a unit-demand buyer. Games Econom. Behav. 110:139–164.CrossrefGoogle Scholar
  • Dong C, Chen Y, Zeng B (2018) Generalized inverse optimization through online learning. Bengio S, Wallach H, Larochelle H, Grauman K, Cesa-Bianchi N, Garnett R, eds. Proc. 32nd Conf. Neural Inform. Processing Systems (NeurIPS, Montreal, Canada),86–95.Google Scholar
  • Dong L, Kouvelis P, Tian Z (2009) Dynamic pricing and inventory control of substitute products. Manufacturing Service Oper. Management 11(2):317–339.LinkGoogle Scholar
  • Einav L, Kuchler T, Levin J, Sundaresan N (2011) Learning from seller experiments in online markets. NBER Working Paper No. 17385, National Bureau of Economic Research, Cambridge, MA.Google Scholar
  • Farias VF, Jagabathula S, Shah D (2013) A nonparametric approach to modeling choice with limited data. Management Sci. 59(2):305–322.LinkGoogle Scholar
  • Feng G, Li X, Wang Z (2017) On the relation between several discrete choice models. Oper. Res. 65(6):1516–1525.LinkGoogle Scholar
  • Ferrante M, Saltalamacchia M (2014) The coupon collector’s problem. Materials Matemàtics 2014(2):1–35.Google Scholar
  • Fox JT (2007) Semiparametric estimation of multinomial discrete-choice models using a subset of choices. RAND J. Econom. 38(4):1002–1019.CrossrefGoogle Scholar
  • Fudenberg D, Iijima R, Strzalecki T (2015) Stochastic choice and revealed perturbed utility. Econometrica 83(6):2371–2409.CrossrefGoogle Scholar
  • Gallego G, Topaloglu H (2019) Revenue Management and Pricing Analytics, vol. 209 (Springer, New York).CrossrefGoogle Scholar
  • Gallego G, Wang R (2014) Multiproduct price optimization and competition under the nested logit model with product differentiated price sensitivities. Oper. Res. 62(2):450–461.LinkGoogle Scholar
  • Hanson W, Martin RK (1990) Optimal bundle pricing. Management Sci. 36(2):155–174.LinkGoogle Scholar
  • Hanson W, Martin K (1996) Optimizing multinomial logit profit functions. Management Sci. 42(7):992–1003.LinkGoogle Scholar
  • Hofbauer J, Sandholm WH (2002) On the global convergence of stochastic fictitious play. Econometrica 70(6):2265–2294.CrossrefGoogle Scholar
  • Huchette J, Vielma JP (2017) Nonconvex piecewise linear functions: Advanced formulations and simple modeling tools. Preprint, submitted July 31, https://arxiv.org/abs/1708.00050.Google Scholar
  • Huh WT, Li H (2015) Technical note: Pricing under the nested attraction model with a multistage choice structure. Oper. Res. 63(4):840–850.LinkGoogle Scholar
  • Keshavarz A, Wang Y, Boyd S (2011) Imputing a convex objective function. 2011 IEEE Internat. Sympos. Intelligent Control (IEEE), 613–619.Google Scholar
  • Lewbel A (1998) Semiparametric latent variable model estimation with endogenous or mismeasured regressors. Econometrica 66(1):105–121.CrossrefGoogle Scholar
  • Li H, Huh WT (2011) Pricing multiple products with the multinomial logit and nested logit models: Concavity and implications. Manufacturing Service Oper. Management 13(4):549–564.LinkGoogle Scholar
  • Li H, Webster S (2017) Optimal pricing of correlated product options under the paired combinatorial logit model. Oper. Res. 65(5):1215–1230.LinkGoogle Scholar
  • Li G, Rusmevichientong P, Toplagalou H (2015) The d-level nested logit model: Assortment and price optimization problems. Oper. Res. 63(2):325–341.LinkGoogle Scholar
  • Li H, Webster S, Mason N, Kempf K (2019) Product-line pricing under discrete mixed multinomial logit demand: Winner—2017 M&SOM practice-based research competition. Manufacturing Service Oper. Management 21(1):14–28.LinkGoogle Scholar
  • Magnanti TL, Stratila D (2012) Separable concave optimization approximately equals piecewise-linear optimization. Preprint, submitted January 16, https://arxiv.org/abs/1201.3148.Google Scholar
  • Manski CF (1975) Maximum score estimation of the stochastic utility model of choice. J. Econometrics 3(3):205–228.CrossrefGoogle Scholar
  • Marandi A, Lurkin V (2020) Static pricing problems under mixed multinomial logit demand. Preprint, submitted May 15, https://arxiv.org/abs/2005.07482.Google Scholar
  • Misener R, Floudas C (2012) Global optimization of mixed-integer quadratically-constrained quadratic programs (miqcqp) through piecewise-linear and edge-concave relaxations. Math. Programming 136(1):155–182.CrossrefGoogle Scholar
  • Mishra VK, Natarajan K, Padmanabhan D, Teo CP, Li X (2014) On theoretical and empirical aspects of marginal distribution choice models. Management Sci. 60(6):1511–1531.LinkGoogle Scholar
  • Myerson R (1981) Optimal auction design. Math. Oper. Res. 6(1):58–73.LinkGoogle Scholar
  • Natarajan K, Song M, Teo C-P (2009) Persistency model and its applications in choice modeling. Management Sci. 55(3):453–469.LinkGoogle Scholar
  • Shi X, Shum M, Song W (2018) Estimating semi-parametric panel multinomial choice models using cyclic monotonicity. Econometrica 86(2):737–761.CrossrefGoogle Scholar
  • Song J-S, Xue ZL, Shen X (2021) Demand management and inventory control for substitutable products. Preprint, submitted June 16, https://papers.ssrn.com/sol3/papers.cfm?abstract_id=3866775.Google Scholar
  • Talluri K, van Ryzin G (2004) Revenue management under a general discrete choice model of customer behavior. Management Sci. 50(1):15–33.LinkGoogle Scholar
  • van de Geer R, Bhulai S (2016) Optimal pricing under mixed logit choice. Preprint, submitted May 26, https://arxiv.org/abs/1605.08340.Google Scholar
  • Vershynin R (2018) High-Dimensional Probability: An Introduction with Applications in Data Science, vol. 47 (Cambridge University Press, Cambridge, UK).CrossrefGoogle Scholar
  • Zhang H, Rusmevichientong P, Topaloglu H (2018) Technical note—Multiproduct pricing under the generalized extreme value models with homogeneous price sensitivity parameters. Oper. Res. 66(6):549–564.LinkGoogle Scholar
Previous
Back to Top
Next
INFORMS site uses cookies to store information on your computer. Some are essential to make our site work; Others help us improve the user experience. By using this site, you consent to the placement of these cookies. Please read our Privacy Statement to learn more.
Agree