A mixture model for survival data with both latent and non-latent cure fraction

Resumo

One of the most popular cure rate models in the literature is the Berkson and Gage mixture model. A characteristic of this model is that it considers the cure to be a latent event. However, there are situations in which the cure is well known, and this information must be considered in the analysis. In this context, this paper proposes a mixture model that accommodates both latent and non-latent cure fractions. More specifically, the proposal is to extend the Berkson and Gage mixture model to include the knowledge of the cure. A simulation study was conducted to investigate the asymptotic properties of maximum likelihood estimators. Finally, the proposed model is illustrated through an application to credit risk modeling.

Descrição

Citação

NAKANO, Eduardo Yoshio; ALMEIDA, Frederico Machado; CARDIAL, Marcílio Ramos Pereira. A mixture model for survival data with both latent and non-latent cure fractions. Stats, Basel, v. 8, n. 3, e82, 2025. DOI: 10.3390/stats8030082. Disponível em: https://www.mdpi.com/2571-905X/8/3/82. Acesso em: 29 jun. 2026.