The hardware and bandwidth for this mirror is donated by dogado GmbH, the Webhosting and Full Service-Cloud Provider. Check out our Wordpress Tutorial.
If you wish to report a bug, or if you are interested in having us mirror your free-software or open-source project, please feel free to contact us at mirror[@]dogado.de.

Defining and using objects of class SURVIVAL

John Aponte

Introduction

Here we present examples on how to construct and use objects of the class SURVIVAL.

The function s_factory(s_family,...) is a function that call the constructor of the family of distribution. Each family has it own set of parameters. As the factories implement polymorphic behavior according to the parameters given, it is not possible to partial match the name of the parameters and they need to be spell correctly. If an error on processing the parameters, the factory return a message with the set of parameters accepted for that factory.

Once an object of a class SURVIVAL is instantiated, it has access to the following set of methods:

Instead of using the helper functions to call this methods, the methods can be called directly from the object as:

In addition, the following functions help to plot the distributions

Functions to plots to simulated proportional hazards, accelerated failure time and accelerated hazard models:

This functions produce Kaplan-Meier curves and Cumulative hazard curves for nsimsimulations of the baseline distribution and the corresponding proportional hazard, accelerate failure time censored at timeto time.

The simulation of survival times and survival times with hazard ratios follow the methods described by Bender, Augustin, and Blettner (2003) and Leemis (1987)

library(survobj)
library(survival)
library(ggplot2)

Exponential Distribution

The canonical parameter of the exponential distribution is called lambda and represents a constant hazard over time. The units of lambda define the units of time for a distribution. For example if lambda = 3 is used to represent the probability of having 3 events in 1 year, the survival function sfx(SURVIVAL, 1) calculate the proportion of the population free of events at 1 year.

The distribution can be defined also with the proportion of the population free of events (surv) at time t or the proportion of the population with events (fail) at time t

# Instanciate an object of class SURVIVAL with the Exponential distribution
obj1 <- s_factory(s_exponential, lambda = 3)
obj1
#> SURVIVAL object
#> Distribution:  EXPONENTIAL 
#> lambda : 3

# Survival at time 1
sfx(obj1,1)
#> [1] 0.04978707

# Hazard at time 1
hfx(obj1,1)
#> [1] 3

# Cumulative hazard at time 1
Cum_Hfx(obj1,1)
#> [1] 3

# Inverse of the cumulative hazard 0.6
invCum_Hfx(obj1, 0.6)
#> [1] 0.2

# Plot of the distribution
plot(obj1)

The next set of examples show how to define an exponential distribution based on the surviving or failing proportion at time t

obj2 <- s_exponential(surv = 0.8, t = 1)
obj2
#> SURVIVAL object
#> Distribution:  EXPONENTIAL 
#> lambda : 0.2231436

obj3 <- s_exponential(fail = 0.2, t = 1)
obj3
#> SURVIVAL object
#> Distribution:  EXPONENTIAL 
#> lambda : 0.2231436

The following code shows how to make 100 simulations of 1000 subjects with an object of the SURVIVAL class. The red line is the value from the distribution.

obj4 <- s_exponential(surv = 0.25, t = 10)
ggplot_survival_random(obj4, timeto=10, subjects=1000, nsim=100, alpha = 0.1)

Weibull distribution

The canonical parameters of the Weibull distribution are scale and shape. The scale carry on the information about the time units. The scale parameter can be derived from the proportion surviving or failing at a given time but the shape needs to be provided by the user. Both scale and shape needs to be numbers bigger than 0. A value of shape equal to 1 is similar to an exponential distribution with lambda parameter equal to the scale. If the shape is bigger than 1 the hazard is increasing which means more events at the end of follow up, and if between 0 and 1 is decreasing which translate to more events at the beginning of the time at risk.

The following code shows the effect of the shape parameter on distributions with the same scale.

wobj1 <- s_weibull(scale = 3, shape = 0.5)
wobj2 <- s_weibull(scale = 3, shape = 1)
wobj3 <- s_weibull(scale = 3, shape = 1.5)

par(mfrow=c(2,3))
plot(
  wobj1$sfx,
  from = 0,
  to = 1,
  main = "Weibull with shape 0.5",
  xlab = "Time",
  ylab = "Proportion without events",
  ylim = c(0,1))
plot(
  wobj2$sfx,
  from = 0,
  to = 1,
  main = "Weibull with shape 1",
  xlab = "Time",
  ylab = "Proportion without events",
  ylim = c(0,1))
plot(
  wobj3$sfx,
  from = 0,
  to = 1,
  main = "Weibull with shape 1.5",
  xlab = "Time",
  ylab = "Proportion without events",
  ylim = c(0,1))
plot(
  wobj1$hfx,
  from = 0,
  to = 1,
  xlab = "Time",
  ylab = "hazard")
plot(
  wobj2$hfx,
  from = 0,
  to = 1,
  xlab = "Time",
  ylab = "hazard")
plot(
  wobj3$hfx,
  from = 0,
  to = 1,
  xlab = "Time",
  ylab = "hazard")

par(mfrow=c(1,1))

Gompertz distribution

The Gompertz distribution have two canonical parameters, the scale and the shape. The scale needs to be a number higher than zero, and represents the hazard at time 0. The shape can be any real number. Negative shape produce a decreasing hazard. Positive shape produces a increasing hazard. If the shape is zero, the distribution is reduced to an exponential distribution, but this is not implemented in this package. Instead an error is produced.

Similarly to the other distributions, the scale can be derived from the survival or failing proportion at a given time, but the shape parameter needs to be provided.

The following graph shows the effect of the scale parameter on the Gompertz distribution


# define a function to generate and plot Gompertz distributions
plot_sfx_gompertz<- function(shape, scale = 3, timeto = 1){
  plot(
    s_gompertz(shape = shape, scale = scale)$sfx,
    from = 0,
    to = timeto,
    main = paste("Shape: ", shape),
    xlab = "Time",
    ylab = "Proportion without events",
    ylim = c(0,1)
    )
}

plot_hfx_gompertz<- function(shape, scale = 3, timeto = 1){
  plot(
    s_gompertz(shape = shape, scale = scale)$hfx,
    from = 0,
    to = timeto,
    xlab = "Time",
    ylab = "hazard",
    ylim = c(2,4)
    )
}

par(mfrow=c(2,4))
plot_sfx_gompertz(shape = -0.25)
plot_sfx_gompertz(shape = -0.10)
plot_sfx_gompertz(shape = 0.10)
plot_sfx_gompertz(shape = 0.25)
plot_hfx_gompertz(shape = -0.25)
plot_hfx_gompertz(shape = -0.10)
plot_hfx_gompertz(shape = 0.10)
plot_hfx_gompertz(shape = 0.25)

par(mfrow = c(1,1))

Piecewise Exponential distribution

The Piecewise Exponential distribution is a very flexible distribution where the hazard is treated as constant until a breaks occurs and the value of a new hazard is used. The class implements two parameters the breaks that defines the breaks points and the hazards that define the hazard used until the break point time. The factory function will provide a warning if the last break is not Inf as otherwise the distribution is not completely defined.

The parameters break = c(1,2,3,Inf), hazards = c(0.1,3,4,3) implements a distribution where the hazard is 0.1 until time 1, 3 from time 1 until time 2, a hazard of 4 until time 3 and from that point a hazard of 3 again.

The distribution can be also defined with the proportion surviving or failing, breaks and segments. In this case the segments are scaled to create hazards that results in a specified proportion surviving or failing at the last not Inf break point. For example the parameters surv = 0.2, breaks = c(1,2,3,Inf), segments = c(1, 2, 3, 1) will scale the segments to hazards in way that at time = 3 the surviving proportion is 0.2. See the following example

pobj <- s_piecewise(surv = 0.2, breaks = c(1,2,3,Inf), segments = c(1,2,3,1))
pobj
#> SURVIVAL object
#> Distribution:  PIECEWISE 
#> breaks : 1 2 3 Inf 
#> hazards : 0.2682397 0.5364793 0.804719 0.2682397
pobj$sfx(3)
#> [1] 0.2
plot_survival(pobj, timeto = 3)

Log-logistic distribution

The Log-logistic distribution have two canonical parameters, the scale and the shape parameters.

pobj <- s_loglogistic(scale = 3, shape = 1.5)
plot_survival(pobj, timeto = 3)

Log-Normal distribution

The Log-normal distribution have two canonical parameters. The shape parameter that defined the median value of the distribution, and the shape parameter that represents the standard deviation of the distribution in the log scale.

pobj <- s_lognormal(scale = 1.5, shape = 0.8)
plot_survival(pobj, timeto = 3)

Comparison of SURVIVAL objects

The function compare_survival() can produce a graphic comparison of two SURVIVAL objects. The objects no need to be from the same distribution family.


cobj1<- s_exponential(lambda = 3)
cobj2<- s_gompertz(scale = 3, shape = 0.4)
compare_survival(cobj1, cobj2, timeto = 2)

References

Bender, R., Thomas Augustin, and Maria Blettner. 2003. “Generating Survival Times to Simulate Cox Proportional Hazards Models.” Universitätsbibliothek Der Ludwig-Maximilians-Universität München. https://doi.org/10.5282/UBM/EPUB.1716.
Leemis, Lawrence M. 1987. “Variate Generation for Accelerated Life and Proportional Hazards Models.” Operations Research 35 (6): 892–94.

These binaries (installable software) and packages are in development.
They may not be fully stable and should be used with caution. We make no claims about them.
Health stats visible at Monitor.