Implementation of golden section search for extremum in R

How can we modified this code to more efficient one and search until a tolerance level is reached for p1-p2 and in result we get the extremum value? Is there any faster algorithm for finding the extremum than this golden section serach ?

``````    lambda<-(sqrt(5)-1)/2

golden.section<-function(f, pL, pU, p1, p2, top, result){
if (top==26){
return(result)
}
else if(top==1){
p1<-pL + (1-lambda)*(pU - pL)
p2<-pU - (1-lambda)*(pU - pL)
}
result[top,]<-c(p1,p2)
if(f(p2) < f(p1)){
pU<-p2
pL<-pL
p2<-p1
p1<-pL + (1-lambda)*(pU - pL)
} else if (f(p2) > f(p1)){
pU <- pU
pL <- p1
p1 <- p2
p2<-pU - (1-lambda)*(pU - pL)
}
result<-golden.section(f, pL, pU, p1, p2, top=top+1, result)
return(result)
}

result<-data.frame(p1=rep(NA, 25), p2=rep(NA, 25))
result<-golden.section(function(x) -(x - 1.235)^2 + 0.78 * x + 0.2,
-5, 5, NA, NA, 1, result)
``````
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Is there a reason not to use the built-in `optimize()` function, which uses "a combination of golden section search and successive parabolic interpolation" ? Based on this benchmark, it's 78x faster than your code ... (although it doesn't save all of the successive values tried)

``````ff <- function(x) -(x - 1.235)^2 + 0.78 * x + 0.2
library(rbenchmark)
benchmark(golden.section(ff,-5, 5, NA, NA, 1, result),
optimize(ff,c(-5,5)))
##                   test replications elapsed relative  user.self sys.self
## 1 golden.section(...)           100   0.936       78     0.904    0.032
## optimize(ff, c(-5, 5))          100   0.012        1     0.012    0.000
``````
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