The Need for Market Segmentation in Buy-Till-You-Defect Models

Buy-till-you-defect [BTYD] models are built for companies operating in a non- contractual setting to predict customers’ transaction frequency, amount and timing as well as customer lifetime. These models tend to perform well, although they often predict unrealistically long lifetimes for a substantial fraction of the customer base. This obvious lack of face validity limits the adoption of these models by practitioners. Moreover, it highlights a flaw in these models. Based on a simulation study and an empirical analysis of different datasets, we argue that such long lifetime predictions can result from the existence of multiple segments in the customer base. In most cases there are at least two segments: one consisting of customers who purchase the service or product only a few times and the other of those who are frequent purchasers. Customer heterogeneity modeling in the current BTYD models is insufficient to account for such segments, thereby producing unrealistic lifetime predictions. We present an extension over the current BTYD models to address the extreme lifetime prediction issue where we allow for segments within the customer base. More specifically, we consider a mixture of log-normals distribution to capture the heterogeneity across customers. Our model can be seen as a variant of the hierarchical Bayes [HB] Pareto/NBD model. In addition, the proposed model allows us to relate segment membership as well as within segment customer heterogeneity to selected customer characteristics. Our model, therefore, also increases the explanatory power of BTYD models to a great extent. We are now able to evaluate the impact of customers’ characteristics on the membership probabilities of different segments. This allows, for example, one to a-priori predict which customers are likely to become frequent purchasers. The proposed model is compared against the benchmark Pareto/NBD model (Schmittlein, Morrison, and Colombo 1987) and its HB extension (Abe 2009) on simulated datasets as well as on a real dataset from a large grocery e-retailer in a Western European country. Our BTYD model indeed provides a useful customer segmentation that allows managers to draw conclusions on how customers’ purchase and defection behavior are associated with their shopping characteristics such as basket size and the delivery fee paid.

[1]  Rutger van Oest,et al.  Extending the BG/NBD: A Simple Model of Purchases and Complaints , 2010 .

[2]  P. Green,et al.  On Bayesian Analysis of Mixtures with an Unknown Number of Components (with discussion) , 1997 .

[3]  Makoto Abe,et al.  "Counting Your Customers" One by One: A Hierarchical Bayes Extension to the Pareto/NBD Model , 2009, Mark. Sci..

[4]  C SchmittleinDavid,et al.  Counting Your Customers , 1987 .

[5]  Michael I. Jordan,et al.  Nonparametric empirical Bayes for the Dirichlet process mixture model , 2006, Stat. Comput..

[6]  David C. Schmittlein,et al.  Counting Your Customers: Who-Are They and What Will They Do Next? , 1987 .

[7]  M. Stephens Bayesian analysis of mixture models with an unknown number of components- an alternative to reversible jump methods , 2000 .

[8]  W. Reinartz,et al.  On the Profitability of Long-Life Customers in a Noncontractual Setting: An Empirical Investigation and Implications for Marketing , 2000 .

[9]  Sylvia Frühwirth-Schnatter,et al.  Finite Mixture and Markov Switching Models , 2006 .

[10]  Peter Green,et al.  Markov chain Monte Carlo in Practice , 1996 .

[11]  W. K. Hastings,et al.  Monte Carlo Sampling Methods Using Markov Chains and Their Applications , 1970 .

[12]  Peter E. Rossi,et al.  Bayesian Statistics and Marketing , 2005 .

[13]  Donald Geman,et al.  Stochastic Relaxation, Gibbs Distributions, and the Bayesian Restoration of Images , 1984, IEEE Transactions on Pattern Analysis and Machine Intelligence.

[14]  Agostino Nobile,et al.  Bayesian finite mixtures with an unknown number of components: The allocation sampler , 2007, Stat. Comput..

[15]  Peter S. Fader,et al.  New Perspectives on Customer "Death" Using a Generalization of the Pareto/NBD Model , 2011, Mark. Sci..

[16]  Peter S. Fader,et al.  Counting Your Customers the Easy Way: An Alternative to the Pareto/NBD Model , 2005 .

[17]  Philip Hans Franses,et al.  A dynamic multinomial probit model for brand choice with different long‐run and short‐run effects of marketing‐mix variables , 2000 .

[18]  Carl E. Rasmussen,et al.  The Infinite Gaussian Mixture Model , 1999, NIPS.

[19]  Robert A. Peterson,et al.  Customer Base Analysis: An Industrial Purchase Process Application , 1994 .

[20]  Peter E. Rossi,et al.  An exact likelihood analysis of the multinomial probit model , 1994 .

[21]  Florian von Wangenheim,et al.  Instant Customer Base Analysis: Managerial Heuristics Often “Get it Right”: , 2008 .

[22]  Petros Dellaportas,et al.  Multivariate mixtures of normals with unknown number of components , 2006, Stat. Comput..

[23]  Bruce Cooil,et al.  Approaches to Customer Segmentation , 2008 .

[24]  C. Robert,et al.  Estimating Mixtures of Regressions , 2003 .

[25]  Lancelot F. James,et al.  Approximate Dirichlet Process Computing in Finite Normal Mixtures , 2002 .