In non-Markov multi-state models, the traditional Aalen–Johansen (AJ) estimator for state transition probabilities is generally not valid. An alternative, suggested by Putter and Spitioni, is to analyse a subsample of the full data, consisting of the individuals present in a specific state at a given landmark time-point. The AJ estimator of occupation probabilities is then applied to the landmark subsample. Exploiting the result by Datta and Satten, that the AJ estimator is consistent for state occupation probabilities even in non-Markov models given that censoring is independent of state occupancy and times of transition between states, the landmark Aalen–Johansen (LMAJ) estimator provides consistent estimates of transition probabilities. ...
In longitudinal studies of disease, patients can experience several events across a follow-up perio...
One major goal in clinical applications of multi-state models is the estimation of transition probab...
We consider estimation of integrated transition hazard and stage occupation probabilities using righ...
In non-Markov multi-state models, the traditional Aalen–Johansen (AJ) estimator for state transition...
The topic non-parametric estimation of transition probabilities in non-Markov multi-state models has...
The topic non-parametric estimation of transition probabilities in non-Markov multi-state models has...
Multi-state models are increasingly being used to model complex epidemiological and clinical outcome...
Development and application of statistical models for medical scientific researc
The Aalen-Johansen estimator for calculation of transition probabilities in a multi-state model, bui...
Non-parametric estimation of the transition probabilities in multi-state models is considered for no...
The inference in multi-state models is traditionally performed under a Markov assumption that claims...
Multi-state models can be successfully used for describing complicated event history data, for examp...
Multi-state models are often used for modeling complex event history data. In these models the estim...
Multi-state models can be successfully used for modelling complex event history data. In these model...
One important goal in clinical applications of multi-state models is the estimation of transition pr...
In longitudinal studies of disease, patients can experience several events across a follow-up perio...
One major goal in clinical applications of multi-state models is the estimation of transition probab...
We consider estimation of integrated transition hazard and stage occupation probabilities using righ...
In non-Markov multi-state models, the traditional Aalen–Johansen (AJ) estimator for state transition...
The topic non-parametric estimation of transition probabilities in non-Markov multi-state models has...
The topic non-parametric estimation of transition probabilities in non-Markov multi-state models has...
Multi-state models are increasingly being used to model complex epidemiological and clinical outcome...
Development and application of statistical models for medical scientific researc
The Aalen-Johansen estimator for calculation of transition probabilities in a multi-state model, bui...
Non-parametric estimation of the transition probabilities in multi-state models is considered for no...
The inference in multi-state models is traditionally performed under a Markov assumption that claims...
Multi-state models can be successfully used for describing complicated event history data, for examp...
Multi-state models are often used for modeling complex event history data. In these models the estim...
Multi-state models can be successfully used for modelling complex event history data. In these model...
One important goal in clinical applications of multi-state models is the estimation of transition pr...
In longitudinal studies of disease, patients can experience several events across a follow-up perio...
One major goal in clinical applications of multi-state models is the estimation of transition probab...
We consider estimation of integrated transition hazard and stage occupation probabilities using righ...