Uplift Modeling
Uplift modeling targets the people a marketing action actually changes, not the people most likely to buy anyway. Where a conventional response model predicts the probability of purchase, an uplift model predicts the difference a treatment makes — the incremental effect of, say, sending a coupon — and uses it to find 'persuadables' while avoiding 'sure things,' 'lost causes,' and especially 'sleeping dogs' who react negatively to contact. Nicholas Radcliffe and Patrick Surry, pioneers of the technique, formalized significance-based uplift trees that split on the difference in treatment-versus-control response rather than on response alone, and introduced the Qini curve to evaluate incremental gain. Pierre Gutierrez and Jean-Yves Gerardy's literature review situates uplift modeling squarely within causal inference, organizing the main estimation strategies and metrics. Because the quantity of interest is a conditional average treatment effect, uplift modeling is most reliable when built on randomized treatment and control data. The payoff is sharper, more profitable targeting: spend marketing effort where it produces genuine incremental response instead of rewarding behavior that would have happened regardless.
Registro de origem
Citações copiadas literalmente do registro de origem do método. Nenhuma verificação em nível de alegação é inferida delas.
- Radcliffe, N. J., & Surry, P. D. (2011). Real-World Uplift Modelling with Significance-Based Uplift Trees. Stochastic Solutions White Paper TR-2011-1. · URL
- Gutierrez, P., & Gerardy, J.-Y. (2017). Causal Inference and Uplift Modelling: A Review of the Literature. Proceedings of Machine Learning Research (PMLR), 67, 1-13. · URL
Alegações curadas
Alegações persistidas no livro-razão de evidências, cada uma com sua própria avaliação.
Esta visualização não inventa uma avaliação de alegação quando o livro-razão não a possui.
Métodos relacionados
Gerado a partir do grafo de métodos e mostrado como relações sugeridas por máquina — nenhuma alegação de evidência é inferida.