pwesim: simulating the test statistics
In PWEALL: Design and Monitoring of Survival Trials Accounting for Complex Situations
pwesim R Documentation
simulating the test statistics
Description
This will simulate the test statistics accouting for staggered entry, delayed treatment effect, treatment crossover and loss to follow-up.
Usage
pwesim(t=seq(1,2,by=0.1),taur=1.2,u=c(1/taur,1/taur),ut=c(taur/2,taur),pi1=0.5,
rate11=c(1,0.5),rate21=rate11,rate31=c(0.7,0.4),
rate41=rate21,rate51=rate21,ratec1=c(0.5,0.6),
rate10=rate11,rate20=rate10,rate30=rate31,
rate40=rate20,rate50=rate20,ratec0=c(0.6,0.5),
tchange=c(0,1),type1=1,type0=1,
rp21=0.5,rp20=0.5,
n=1000,rn=200,testtype=c(1,2,3,4))
Arguments
t
a vector of time points
taur
Recruitment time
u
Piecewise constant recuitment rate
ut
Recruitment intervals
pi1
Allocation probability for the treatment group
rate11
Hazard before crossover for the treatment group
rate21
Hazard after crossover for the treatment group
rate31
Hazard for time to crossover for the treatment group
rate41
Hazard after crossover for the treatment group for complex case
rate51
Hazard after crossover for the treatment group for complex case
ratec1
Hazard for time to censoring for the treatment group
rate10
Hazard before crossover for the control group
rate20
Hazard after crossover for the control group
rate30
Hazard for time to crossover for the control group
rate40
Hazard after crossover for the control group for complex case
rate50
Hazard after crossover for the control group for complex case
ratec0
Hazard for time to censoring for the control group
tchange
A strictly increasing sequence of time points at which the event rates changes. The first element of tchange must be zero. It must have the same length as rate11, rate21, rate31, etc.
type1
Type of crossover in the treatment group
type0
Type of crossover in the control group
rp21
re-randomization prob in the treatment group
rp20
re-randomization prob in the control group
n
number of subjects
rn
number of simulations
testtype
types of test statistics.
Details
The hazard functions corresponding to rate11,...,rate51,ratec1, rate10,...,rate50,ratec0 are all piecewise constant function taking the form \lambda(t)=\sum_{j=1}^m \lambda_j I(t_{j-1}\le t<t_j), where \lambda_1,\ldots,\lambda_m are the corresponding elements of the rates and t_0,\ldots,t_{m-1} are the corresponding elements of tchange, t_m=\infty. Note that all the rates must have the same tchange.
Value
outr
test statistics at each time point and each simulation run
Note
Version 1.0 (7/19/2016)
Author(s)
Xiaodong Luo
References
Luo, et al. (2017)
See Also
pwe,rpwe,qpwe,ovbeta,innervar
Examples
taur<-1.2
u<-c(1/taur,1/taur)
ut<-c(taur/2,taur)
r11<-c(1,0.5)
r21<-c(0.5,0.8)
r31<-c(0.7,0.4)
r41<-r51<-r21
rc1<-c(0.5,0.6)
r10<-c(1,0.7)
r20<-c(0.5,1)
r30<-c(0.3,0.4)
r40<-r50<-r20
rc0<-c(0.2,0.4)
ar<-pwesim(t=seq(1,2,by=0.1),taur=taur,u=u,ut=ut,pi1=0.5,
rate11=r11,rate21=r21,rate31=r31,rate41=r41,rate51=r51,ratec1=rc1,
rate10=r10,rate20=r20,rate30=r30,rate40=r40,rate50=r50,ratec0=rc0,
tchange=c(0,1),type1=1,type0=1,
n=300,rn=10)
PWEALL documentation built on Aug. 9, 2023, 9:08 a.m.
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| pwesim | R Documentation |
simulating the test statistics
Description
This will simulate the test statistics accouting for staggered entry, delayed treatment effect, treatment crossover and loss to follow-up.
Usage
pwesim(t=seq(1,2,by=0.1),taur=1.2,u=c(1/taur,1/taur),ut=c(taur/2,taur),pi1=0.5,
rate11=c(1,0.5),rate21=rate11,rate31=c(0.7,0.4),
rate41=rate21,rate51=rate21,ratec1=c(0.5,0.6),
rate10=rate11,rate20=rate10,rate30=rate31,
rate40=rate20,rate50=rate20,ratec0=c(0.6,0.5),
tchange=c(0,1),type1=1,type0=1,
rp21=0.5,rp20=0.5,
n=1000,rn=200,testtype=c(1,2,3,4))
Arguments
t |
a vector of time points |
taur |
Recruitment time |
u |
Piecewise constant recuitment rate |
ut |
Recruitment intervals |
pi1 |
Allocation probability for the treatment group |
rate11 |
Hazard before crossover for the treatment group |
rate21 |
Hazard after crossover for the treatment group |
rate31 |
Hazard for time to crossover for the treatment group |
rate41 |
Hazard after crossover for the treatment group for complex case |
rate51 |
Hazard after crossover for the treatment group for complex case |
ratec1 |
Hazard for time to censoring for the treatment group |
rate10 |
Hazard before crossover for the control group |
rate20 |
Hazard after crossover for the control group |
rate30 |
Hazard for time to crossover for the control group |
rate40 |
Hazard after crossover for the control group for complex case |
rate50 |
Hazard after crossover for the control group for complex case |
ratec0 |
Hazard for time to censoring for the control group |
tchange |
A strictly increasing sequence of time points at which the event rates changes. The first element of tchange must be zero. It must have the same length as |
type1 |
Type of crossover in the treatment group |
type0 |
Type of crossover in the control group |
rp21 |
re-randomization prob in the treatment group |
rp20 |
re-randomization prob in the control group |
n |
number of subjects |
rn |
number of simulations |
testtype |
types of test statistics. |
Details
The hazard functions corresponding to rate11,...,rate51,ratec1, rate10,...,rate50,ratec0 are all piecewise constant function taking the form \lambda(t)=\sum_{j=1}^m \lambda_j I(t_{j-1}\le t<t_j), where \lambda_1,\ldots,\lambda_m are the corresponding elements of the rates and t_0,\ldots,t_{m-1} are the corresponding elements of tchange, t_m=\infty. Note that all the rates must have the same tchange.
Value
outr |
test statistics at each time point and each simulation run |
Note
Version 1.0 (7/19/2016)
Author(s)
Xiaodong Luo
References
Luo, et al. (2017)
See Also
pwe,rpwe,qpwe,ovbeta,innervar
Examples
taur<-1.2
u<-c(1/taur,1/taur)
ut<-c(taur/2,taur)
r11<-c(1,0.5)
r21<-c(0.5,0.8)
r31<-c(0.7,0.4)
r41<-r51<-r21
rc1<-c(0.5,0.6)
r10<-c(1,0.7)
r20<-c(0.5,1)
r30<-c(0.3,0.4)
r40<-r50<-r20
rc0<-c(0.2,0.4)
ar<-pwesim(t=seq(1,2,by=0.1),taur=taur,u=u,ut=ut,pi1=0.5,
rate11=r11,rate21=r21,rate31=r31,rate41=r41,rate51=r51,ratec1=rc1,
rate10=r10,rate20=r20,rate30=r30,rate40=r40,rate50=r50,ratec0=rc0,
tchange=c(0,1),type1=1,type0=1,
n=300,rn=10)
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