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The greatest blessing in life is in giving and not taking. Survival Analysis. Nonparametric Estimation of Basic Quantities (Sec. 5.4 & Ch. 6). Abbreviated Outline. Survival data are summarized through estimates of the survival function and hazard function.
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The greatest blessing in life is in giving and not taking.
Survival Analysis Nonparametric Estimation of Basic Quantities (Sec. 5.4 & Ch. 6)
Abbreviated Outline • Survival data are summarized through estimates of the survival function and hazard function. • Methods for estimating these functions from a sample of right-censored survival data are described. • These methods are nonparametric. • Non-informative censoring is assumed.
Non-informative Censoring • The knowledge of a censoring time for an individual provides NO further information about this person’s likelihood of survival at a FUTURE time had the individual continued on the study.
Nonparametric Methods • Distribution free: no assumptions about the underlying distribution of the survival times. • Less efficient than parametric methods if the survival times follow a theoretical distribution. • More efficient when no suitable theoretical distributions are known.
Nonparametric Methods • Estimates obtained by nonparametric methods can be helpful in choosing a theoretical distribution, if the main objective is to find a parametric model for the data.
Example: 6-MP • A case-control study • Experimental drug: 6-mercaptopurine (6-MP) for treating acute leukemia • 11 American hospitals participated • 42 patients with complete or partial remission of leukemia were randomly assigned to either 6-MP or a placebo • 21 patients per group • Patients were followed until their leukemia relapse or until the end of the study
Kaplan-Meier Estimator • Also called product-limit estimator • The standard estimator of the survival function using right-censoring data
Kaplan-Meier Estimator Data: • n individuals with observed survival times: z1, z2, …, zn. • Some of them may be right-censored. • There may be > 1 individuals with the same observed survival time. • Let r be the number of distinct uncensored survival times among zis.
Kaplan-Meier Estimator • Sort distinct uncensored zis in ascending order: • Notation:
Example: 6-MP • Consider the 6-MP group:
Kaplan-Meier Estimator • Let tmax be the largest survival time. • For t > tmax,
Example: 6-MP 6-MP group
Example: 6-MP Placebo group
Estimation beyond tmax If tmax is censored, for t > tmax: • Efron (1967) suggests • Gill (1980) suggests
Understanding K-M Estimator • The K-M estimator was constructed by a reduce-sample approach. • The K-M estimator is an extension of the empirical survivor function.
Pointwise Confidence Interval Under certain regularity conditions, the K-M estimator is: • A mle • Consistent • Asymptotically normal
Example: 6-MP 95% C. I. for the 6-MP group:
Potential Problem • If is close to 0 or 1, the resulting confidence limits could lie outside [0,1]. • A possible solution: complementary log-log transformation
Complementary Log-log • Reference: Collect, Sec. 2.2.3. • Comp. log-log transformation: • Find C.I. for first and then convert it back to .
Complementary Log-log • By Delta Method:
Life-table Estimate • Also called actuarial estimate • For large data sets • Grouping survival times into intervals • The process is similar to the formation of a frequency table and a histogram in elementary statistics.
Life-table Estimate • Actuarial assumption: The censored survival times in Ij are uniformly distributed across Ij The average # of individuals at risk in Ij is:
Life-table Estimate An actuarial estimate of pj is:
Estimating the Cumulative Hazard Function • Nelson-Aalen estimate:
