im trying to predict crash time by using lppl model(JLS). My codes can run, but the error is to high....I try with some other initial values, but stillcan't reduce the error.....How i can reduce Standard Residual Error???

```
library(tseries)
library(zoo)
ts<-get.hist.quote(instrument="^KLSE",start="1992-01-01",end="1997-01-01",quote="Close",provider="yahoo",origin="1970-01-01",compression="d",retclass="zoo")
df<-data.frame(ts)
df<-data.frame(Date=as.Date(rownames(df)),Y=df$Close)
df<-df[!is.na(df$Y),]
library(minpack.lm)
df$days<-as.numeric(df$Date-df[1,]$Date)
f<-function(pars,xx){pars$a+pars$b*(pars$tc-xx)^pars$m*(1+pars$c*cos(pars$omega*log(pars$tc-xx)+pars$phi))}
resids<-function(p,observed,xx){df$Y-f(p,xx)}
nls.out<-nls.lm(par=list(a=300,b=-400,tc=1308,m=0.5,omega=19.5,phi=-30,c=-14),fn=resids,observed=df$Y,xx=df$days,control=nls.lm.control(maxiter=1024,ftol=1e-6,maxfev=1e6))
par<-nls.out$par
nls.final<-nls(Y~a+(tc-days)^m*(b+c*cos(omega*log(tc-days)+phi)),data=df,start=par,algorithm="plinear",control=nls.control(maxiter=1024,minFactor=1e-8))
summary(nls.final)
```

Formula: Y ~ a + (tc - days)^m * (b + c * cos(omega * log(tc - days) + phi))

```
Parameters:
Estimate Std. Error t value Pr(>|t|)
a 1.138e+04 1.929e+08 0.000 1.000
b -1.071e+04 1.816e+08 0.000 1.000
tc 1.331e+03 9.911e+02 1.343 0.180
m 3.032e-03 1.888e+00 0.002 0.999
omega 2.399e+01 1.985e+03 0.012 0.990
phi -5.955e+01 1.298e+04 -0.005 0.996
c 1.715e-03 2.915e+01 0.000 1.000
.lin 2.351e+00 3.982e+04 0.000 1.000
Residual standard error: 75.75 on 752 degrees of freedom
Number of iterations to convergence: 55
Achieved convergence tolerance: 3.632e-06
```

the error is too high and the model is poorly fitted to the data.......How i can proceed?