Scalable Inference of Customer Similarities from Interactions Data Using Dirichlet Processes

Author(s)

Braun, Michael; Bonfrer, Andre

Abstract

Under the sociological theory of homophily, people who are similar to one another are more likely to interact with one another. Marketers often have access to data on interactions among customers from which, with homophily as a guiding principle, inferences could be made about the underlying similarities. However, larger networks face a quadratic explosion in the number of potential interactions that need to be modeled. This scalability problem renders probability models of social interactions computationally infeasible for all but the smallest networks. In this paper, we develop a probabilistic framework for modeling customer interactions that is both grounded in the theory of homophily and is flexible enough to account for random variation in who interacts with whom. In particular, we present a novel Bayesian nonparametric approach, using Dirichlet processes, to moderate the scalability problems that marketing researchers encounter when working with networked data. We find that this framework is a powerful way to draw insights into latent similarities of customers, and we discuss how marketers can apply these insights to segmentation and targeting activities.

Date issued

2011-05

URI

http://hdl.handle.net/1721.1/74624

Department

Sloan School of Management

Journal

Marketing Science

Publisher

Institute for Operations Research and the Management Sciences (INFORMS)

Citation

Braun, M., and A. Bonfrer. “Scalable Inference of Customer Similarities from Interactions Data Using Dirichlet Processes.” Marketing Science 30.3 (2011): 513–531.

Version: Author's final manuscript

ISSN

0732-2399

1526-548X