Relaxed Poisson cure rate models Journal Articles

abstract

• The purpose of this article is to make the standard promotion cure rate model (Yakovlev and Tsodikov, ) more flexible by assuming that the number of lesions or altered cells after a treatment follows a fractional Poisson distribution (Laskin, ). It is proved that the well‐known Mittag‐Leffler relaxation function (Berberan‐Santos, ) is a simple way to obtain a new cure rate model that is a compromise between the promotion and geometric cure rate models allowing for superdispersion. So, the relaxed cure rate model developed here can be considered as a natural and less restrictive extension of the popular Poisson cure rate model at the cost of an additional parameter, but a competitor to negative‐binomial cure rate models (Rodrigues et al., ). Some mathematical properties of a proper relaxed Poisson density are explored. A simulation study and an illustration of the proposed cure rate model from the Bayesian point of view are finally presented.

authors

• Rodrigues, Josemar
• Cordeiro, Gauss M
• Cancho, Vicente G
• Balakrishnan, Narayanaswamy

status

• published 

publication date

• March 2016

has subject area

• 0104 Statistics (FoR)
• Bayes Theorem (MeSH)
• Humans (MeSH)
• Likelihood Functions (MeSH)
• Models, Statistical (MeSH)
• Neoplasms (MeSH)
• Poisson Distribution (MeSH)
• Recurrence (MeSH)
• Statistics & Probability (Science Metrix)
• Treatment Outcome (MeSH)

published in

• Biometrical Journal  Journal

keywords

• Bayes Theorem
• Bayesian inference
• Fractional Poisson distribution
• Geometric cure rate model
• Humans
• Likelihood Functions
• Mittag-Leffler relaxation function
• Models, Statistical
• Neoplasms
• Poisson Distribution
• Poisson cure rate model
• Recurrence
• Relaxed Poisson cure rate model
• Treatment Outcome

Digital Object Identifier (DOI)

• 10.1002/bimj.201500051

PubMed ID

• 26686485

start page

• 397

end page

• 415

volume

• 58

issue

• 2