pearson.msm: Pearson-type goodness-of-fit test

A fitted multi-state model, as returned by msm.

This should be an integer vector indicating which interval transitions should be grouped together in the contingency table. Its length should be the number of allowed interval transitions, excluding transitions from absorbing states to absorbing states.

The allowed interval transitions are the set of pairs of states \((a,b)\) for which it is possible to observe \(a\) at one time and \(b\) at any later time. For example, in a "well-disease-death" model with allowed instantaneous 1-2, 2-3 transitions, there are 5 allowed interval transitions. In numerical order, these are 1-1, 1-2, 1-3, 2-2 and 2-3, excluding absorbing-absorbing transitions.

Then, to group transitions 1-1,1-2 together, and transitions 2-2,2-3 together, specify

transitions = c(1,1,2,3,3).

Only transitions from the same state may be grouped. By default, each interval transition forms a separate group.

Number of groups based on quantiles of the time since the start of the process.

Number of groups based on quantiles of the time interval between observations, within time groups

Number of groups based on quantiles of \(\sum_r q_{irr}\), where \(q_{irr}\) are the diagonal entries of the transition intensity matrix for the ith transition. These are a function of the covariate effects and the covariate values at the ith transition: \(q_{irr}\) is minus the sum of the off-diagonal entries \(q_{rs}^{(0)} exp (\beta_{rs}^T z_i)\) on the rth row.

Thus covgroups summarises the impact of covariates at each observation, by calculating the overall rate of progression through states at that observation.

For time-inhomogeneous models specified using the pci argument to msm, if the only covariate is the time period, covgroups is set to 1, since timegroups ensures that transitions are grouped by time.

A vector of arbitrary groups in which to categorise each transition. This can be an integer vector or a factor. This can be used to diagnose specific areas of poor fit. For example, the contingency table might be grouped by arbitrary combinations of covariates to detect types of individual for whom the model fits poorly.

The length of groups should be x$data$n, the number of observations used in the model fit, which is the number of observations in the original dataset with any missing values excluded. The value of groups at observation \(i\) is used to categorise the transition which ends at observation i. Values of groups at the first observation for each subject are ignored.

Estimate an "exact" p-value using a parametric bootstrap.

All objects used in the original call to msm which produced x, such as the qmatrix, should be in the working environment, or else an “object not found” error will be given. This enables the original model to be refitted to the replicate datasets.

Note that groups cannot be used with bootstrapping, as the simulated observations will not be in the same categories as the original observations.

Number of bootstrap replicates.

This is a vector of length x$data$n (the number of observations used in the model fit) giving the time to the next scheduled observation following each time point. This is only used when times to death are known exactly.

For individuals who died (entered an absorbing state) before the next scheduled observation, and the time of death is known exactly, next.obstime would be greater than the observed death time.

If the individual did not die, and a scheduled observation did follow that time point, next.obstime should just be the same as the time to that observation.

next.obstime is used to determine a grouping of the time interval between observations, which should be based on scheduled observations. If exact times to death were used in the grouping, then shorter intervals would contain excess deaths, and the goodness-of-fit statistic would be biased.

If next.obstime is unknown, it is multiply-imputed using a product-limit estimate based on the intervals to observations other than deaths. The resulting tables of transitions are averaged over these imputations. This may be slow.

Number of imputations for the estimation of the distribution of the next scheduled observation time, when there are exact death times.

If TRUE, then times to censoring are included in the estimation of the distribution to the next scheduled observation time. If FALSE, times to censoring are assumed to be systematically different from other observation times.

A vector of length x$data$n, or a common scalar, giving an upper bound for the next scheduled observation time. Used in the multiple imputation when times to death are known exactly. If a value greater than maxtimes is simulated, then the next scheduled observation is taken as censored. This should be supplied, if known. If not supplied, this is taken to be the maximum interval occurring in the data, plus one time unit. For observations which are not exact death times, this should be the time since the previous observation.

Calculate a p-value using the improved approximation of Titman (2009). This is optional since it is not needed during bootstrapping, and it is computationally non-trivial. Only available currently for non-hidden Markov models for panel data without exact death times. Also not available for models with censoring, including time-homogeneous models fitted with the pci option to msm.