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