Negative Log-Likelihood Survival Measure
Source:R/MeasureSurvLogloss.R
mlr_measures_surv.logloss.RdCalculates the cross-entropy, or negative log-likelihood (NLL) or logarithmic (log), loss.
Details
The Log Loss, in the context of probabilistic predictions, is defined as the negative log probability density function, \(f\), evaluated at the observation time (event or censoring), \(t\), $$L_{NLL}(f, t) = -log(f(t))$$
The standard error of the Log Loss, L, is approximated via, $$se(L) = sd(L)/\sqrt{N}$$ where \(N\) are the number of observations in the test set, and \(sd\) is the standard deviation.
The Re-weighted Negative Log-Likelihood (RNLL) or IPCW Log Loss is defined by
$$L_{RNLL}(f, t, \Delta) = -\Delta log(f(t))/G(t)$$
where \(\Delta\) is the censoring indicator and G is the Kaplan-Meier estimator of the
censoring distribution.
So only observations that have experienced the event are taking into account
for RNLL and both \(f(t), G(t)\) are calculated only at the event times.
If only censored observations exist in the test set, NaN is returned.
If task and train_set are passed to $score then G is fit on training data,
otherwise testing data. The first is likely to reduce any bias caused by calculating
parts of the measure on the test data it is evaluating. The training data is automatically
used in scoring resamplings.
Dictionary
This Measure can be instantiated via the dictionary mlr_measures or with the associated sugar function msr():
Parameters
| Id | Type | Default | Levels | Range |
| eps | numeric | 1e-15 | \([0, 1]\) | |
| se | logical | FALSE | TRUE, FALSE | - |
| IPCW | logical | TRUE | TRUE, FALSE | - |
| ERV | logical | FALSE | TRUE, FALSE | - |
Parameter details
eps(numeric(1))
Very small number to substitute zero values in order to prevent errors in e.g. log(0) and/or division-by-zero calculations. Default value is 1e-15.
se(logical(1))
IfTRUEthen returns standard error of the measure otherwise returns the mean across all individual scores, e.g. the mean of the per observation scores. Default isFALSE(returns the mean).
ERV(logical(1))
IfTRUEthen the Explained Residual Variation method is applied, which means the score is standardized against a Kaplan-Meier baseline. Default isFALSE.
IPCW(logical(1))
IfTRUE(default) then returns the \(L_{RNLL}\) score (which is proper), otherwise the \(L_{NLL}\) score (improper).
See also
Other survival measures:
mlr_measures_surv.calib_alpha,
mlr_measures_surv.calib_beta,
mlr_measures_surv.chambless_auc,
mlr_measures_surv.cindex,
mlr_measures_surv.dcalib,
mlr_measures_surv.graf,
mlr_measures_surv.hung_auc,
mlr_measures_surv.intlogloss,
mlr_measures_surv.mae,
mlr_measures_surv.mse,
mlr_measures_surv.nagelk_r2,
mlr_measures_surv.oquigley_r2,
mlr_measures_surv.rcll,
mlr_measures_surv.rmse,
mlr_measures_surv.schmid,
mlr_measures_surv.song_auc,
mlr_measures_surv.song_tnr,
mlr_measures_surv.song_tpr,
mlr_measures_surv.uno_auc,
mlr_measures_surv.uno_tnr,
mlr_measures_surv.uno_tpr,
mlr_measures_surv.xu_r2
Other Probabilistic survival measures:
mlr_measures_surv.graf,
mlr_measures_surv.intlogloss,
mlr_measures_surv.rcll,
mlr_measures_surv.schmid
Other distr survival measures:
mlr_measures_surv.calib_alpha,
mlr_measures_surv.dcalib,
mlr_measures_surv.graf,
mlr_measures_surv.intlogloss,
mlr_measures_surv.rcll,
mlr_measures_surv.schmid
Super classes
mlr3::Measure -> mlr3proba::MeasureSurv -> MeasureSurvLogloss