我想估计以下问题的威力。我有兴趣比较两个都遵循威 bool 分布的组。所以,A 组有两个参数(shape par = a1,scale par = b1),B 组有两个参数(a2, b2)。通过模拟来自感兴趣分布的随机变量(例如,假设不同的尺度和形状参数,即 a1=1.5*a2 和 b1=b2*0.5;或者组之间的差异仅在于形状或尺度参数),应用 log-似然比检验以检验是否 a1=a2 和 b1=b2(或例如 a1=a1,当我们知道 b1=b2 时),并估计检验的功效。
问题是完整模型的对数似然是什么,以及如何在 R 中对其进行编码
a) 有准确的数据,
b) 对于区间删失数据?
也就是说,对于简化模型(当 a1=a2,b1=b2 时)精确和区间删失数据的对数似然为:
LL.reduced.exact <- function(par,data){sum(log(dweibull(data,shape=par[1],scale=par[2])))};
LL.reduced.interval.censored<-function(par, data.lower, data.upper) {sum(log((1-pweibull(data.lower, par[1], par[2])) – (1-pweibull(data.upper, par[1],par[2]))))}
完整模型是什么,当 a1!=a2, b1!=b2 时,考虑到两种不同的观察方案,即当必须估计 4 个参数时(或者,如果有兴趣查看形状参数的差异,必须估计 3 个参数)?
是否可以估计它为不同的组构建两个对数似然并将其相加(即 LL.full<-LL.group1+LL.group2 )?
关于区间删失数据的对数似然,删失是非信息性的,所有观察都是区间删失的。任何更好的想法如何执行此任务将不胜感激。
请在下面找到确切数据的 R 代码来说明问题。非常感谢您提前。
R Code:
# n (sample size) = 500
# sim (number of simulations) = 1000
# alpha = .05
# Parameters of Weibull distributions:
#group 1: a1=1, b1=20
#group 2: a2=1*1.5 b2=b1
n=500
sim=1000
alpha=.05
a1=1
b1=20
a2=a1*1.5
b2=b1
#OR: a1=1, b1=20, a2=a1*1.5, b2=b1*0.5
# the main question is how to build this log-likelihood model, when a1!=a2, and b1=b2
# (or a1!=a2, and b1!=b2)
LL.full<-?????
LL.reduced <- function(par,data){sum(log(dweibull(data,shape=par[1],scale=par[2])))}
LR.test<-function(red,full,df) {
lrt<-(-2)*(red-full)
pvalue<-1-pchisq(lrt,df)
return(data.frame(lrt,pvalue))
}
rejections<-NULL
for (i in 1:sim) {
RV1<-rweibull (n, a1, b1)
RV2<-rweibull (n, a2, b2)
RV.Total<-c(RV1, RV2)
par.start<-c(1, 15)
mle.full<- ????????????
mle.reduced<-optim(par.start, LL, data=RV.Total, control=list(fnscale=-1))
LL.full<-?????
LL.reduced<-mle.reduced$value
LRT<-LR.test(LL.reduced, LL.full, 1)
rejections1<-ifelse(LRT$pvalue<alpha,1,0)
rejections<-c(rejections, rejections1)
}
table(rejections)
sum(table(rejections)[[2]])/sim # estimated power
最佳答案
是的,您可以将两组的对数似然相加(如果它们是单独计算的)。就像您对观测向量的对数似然求和一样,每个观测都有不同的生成参数。
我更喜欢考虑一个大向量(即形状参数),它包含根据协变量结构(即组成员资格)而变化的值。在线性模型上下文中,该向量可以等于线性预测变量(一旦被链接函数适当转换):设计矩阵和回归系数向量的点积。
这是一个(非功能化的)示例:
## setup true values
nobs = 50 ## number of observations
a1 = 1 ## shape for first group
b1 = 2 ## scale parameter for both groups
beta = c(a1, a1 * 1.5) ## vector of linear coefficients (group shapes)
## model matrix for full, null models
mm_full = cbind(grp1 = rep(c(1,0), each = nobs), grp2 = rep(c(0,1), each = nobs))
mm_null = cbind(grp1 = rep(1, nobs*2))
## shape parameter vector for the full, null models
shapes_full = mm_full %*% beta ## different shape parameters by group (full model)
shapes_null = mm_null %*% beta[1] ## same shape parameter for all obs
scales = rep(b1, length(shapes_full)) ## scale parameters the same for both groups
## simulate response from full model
response = rweibull(length(shapes_full), shapes_full, scales)
## the log likelihood for the full, null models:
LL_full = sum(dweibull(response, shapes_full, scales, log = T))
LL_null = sum(dweibull(response, shapes_null, scales, log = T))
## likelihood ratio test
LR_test = function(LL_null, LL_full, df) {
LR = -2 * (LL_null - LL_full) ## test statistic
pchisq(LR, df = df, ncp = 0, lower = F) ## probability of test statistic under central chi-sq distribution
}
LR_test(LL_null, LL_full, 1) ## 1 degrees freedom (1 parameter added)
要编写一个对数似然函数来查找 Weibull 模型的 MLE,其中形状参数是协变量的某个线性函数,您可以使用相同的方法:
## (negative) log-likelihood function
LL_weibull = function(par, data, mm, inv_link_fun = function(.) .){
P = ncol(mm) ## number of regression coefficients
N = nrow(mm) ## number of observations
shapes = inv_link_fun(mm %*% par[1:P]) ## shape vector (possibly transformed)
scales = rep(par[P+1], N) ## scale vector
-sum(dweibull(data, shape = shapes, scale = scales, log = T)) ## negative log likelihood
}
那么您的电源模拟可能如下所示:
## function to simulate data, perform LRT
weibull_sim = function(true_shapes, true_scales, mm_full, mm_null){
## simulate response
response = rweibull(length(true_shapes), true_shapes, true_scales)
## find MLE
mle_full = optim(par = rep(1, ncol(mm_full)+1), fn = LL_weibull, data = response, mm = mm_full)
mle_null = optim(par = rep(1, ncol(mm_null)+1), fn = LL_weibull, data = response, mm = mm_null)
## likelihood ratio test
df = ncol(mm_full) - ncol(mm_null)
return(LR_test(-mle_null$value, -mle_full$value, df))
}
## run simulations
nsim = 1000
pvals = sapply(1:nsim, function(.) weibull_sim(shapes_full, scales, mm_full, mm_null) )
## calculate power
alpha = 0.05
power = sum(pvals < alpha) / nsim
身份链接在上面的示例中工作正常,但对于更复杂的模型,可能需要某种转换。
并且您不必在对数似然函数中使用线性代数——显然,您可以以任何您认为合适的方式构造形状向量(只要您在向量
par 中明确索引适当的生成参数) )。区间删失数据
Weibull 分布(R 中的
pweibull)的累积分布函数 F(T) 给出了时间 T 之前的失效概率。所以,如果观察在时间 T[0] 和 T[1] 之间进行间隔删失,则对象在 T[0] 和 T[1] 之间失败的概率为 F(T[1]) - F(T[0]) :
对象在 T[1] 之前失败的概率减去它在 T[0] 之前失败的概率(T[0] 和 T[1] 之间的 PDF 积分)。
因为 Weibull CDF 已经在 R 中实现,所以修改上面的似然函数很简单:
LL_ic_weibull <- function(par, data, mm){
## 'data' has two columns, left and right times of censoring interval
P = ncol(mm) ## number of regression coefficients
shapes = mm %*% par[1:P]
scales = par[P+1]
-sum(log(pweibull(data[,2], shape = shapes, scale = scales) - pweibull(data[,1], shape = shapes, scale = scales)))
}
或者,如果您不想使用模型矩阵等,而只是限制自己按组索引形状参数向量,则可以执行以下操作:
LL_ic_weibull2 <- function(par, data, nobs){
## 'data' has two columns, left and right times of censoring interval
## 'nobs' is a vector that contains the num. observations for each group (grp1, grp2, ...)
P = length(nobs) ## number of regression coefficients
shapes = rep(par[1:P], nobs)
scales = par[P+1]
-sum(log(pweibull(data[,2], shape = shapes, scale = scales) - pweibull(data[,1], shape = shapes, scale = scales)))
}
测试两个函数是否给出相同的解决方案:
## generate intervals from simulated response (above)
left = ifelse(response - 0.2 < 0, 0, response - 0.2)
right = response + 0.2
response_ic = cbind(left, right)
## find MLE w/ first LL function (model matrix)
mle_ic_full = optim(par = c(1,1,3), fn = LL_ic_weibull, data = response_ic, mm = mm_full)
mle_ic_null = optim(par = c(1,3), fn = LL_ic_weibull, data = response_ic, mm = mm_null)
## find MLE w/ second LL function (groups only)
nobs_per_group = apply(mm_full, 2, sum) ## just contains number of observations per group
nobs_one_group = nrow(mm_null) ## one group so only one value
mle_ic_full2 = optim(par = c(1,1,3), fn = LL_ic_weibull2, data = response_ic, nobs = nobs_per_group)
mle_ic_null2 = optim(par = c(1,3), fn = LL_ic_weibull2, data = response_ic, nobs = nobs_one_group)
关于r - 如何在 R 中编写多参数对数似然函数,我们在Stack Overflow上找到一个类似的问题: https://stackoverflow.com/questions/20786249/