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I am trying to find the fixed point of a logistic distribution function and determine how the fixed point changes for different parameter values. The code looks like:

nfxp.reps <- 0
err <- 10
p <- seq(0, 1, by = 0.0001)
pold <- p
gamma <- 6
k <- 3
while (err > 1E-12) {
  nfxp.reps <- nfxp.reps + 1
  if (nfxp.reps > 999) { 
    stop("The number of NFXP reps needs to be increased. \n")
  pnew <- plogis(-k + gamma * pold) 
  err <- max(abs(pnew - pold))
  pold <- pnew

The above code works very well in the above parameter choices: gamma and k - find 3 fixed points, 2 stable and 1 unstable (where p=0.5). However if I change the above parameter non-proportionally, where the middle fixed point is either above or below 0.5, say for:


The loop is unable to locate the middle fixed point which is p=0.3225 (if gamma=7, k=3)

share|improve this question
up vote 1 down vote accepted

Fixed point iteration by construction cannot find the unstable equilibria in your setup since it is repelling. In other words, unless you start right at the unstable equilibria the nfxp algorithm will always move away from it.

An alternative approach is to use a root solving approach. Of course, there are no guarantees that all fixed points will be found. Here is a simple example:

library(rootSolve) # for the uniroot.all function
pdiff <-function(p0) p0-plogis(-k + gamma * p0) 
> fps= pfind()
> fps
[1] 0.08036917 0.32257992 0.97925817

We can verify this:

pseq =seq(0,1,length=100)
plot(x=pseq ,y= plogis(-k + gamma *pseq),type= 'l')
points(matrix(rep(fps,each=2), ncol=2, byrow=TRUE),pch=19,col='red')

Hope this helps.

share|improve this answer
Thank you very much!!! – user1682980 May 10 '13 at 11:18

I rearrange your code in a new function.

p.fixed <- function(p0,tol = 1E-9,max.iter = 100,k=3,gamma=7,verbose=F){
  pold <- p0
  pnew <-  plogis(-k + gamma * pold) 
  iter <- 1
    while ((abs(pnew - pold) > tol) && (iter < max.iter)){
      pold <- pnew
      pnew <- plogis(-k + gamma * pold) 
      iter <- iter + 1
         cat("At iteration", iter, "value of p is:", pnew, "\n")
    if (abs(pnew - pold) > tol) {
      cat("Algorithm failed to converge")
    else {
      cat("Algorithm converged, in :" ,iter,"iterations \n")

some tests:

Algorithm converged, in : 30 iterations 
[1] 0.08035782
> p.fixed(0.2,k=5,gamma=5)
Algorithm converged, in : 7 iterations 
[1] 0.006927088
> p.fixed(0.2,k=5,gamma=5,verbose=T)
At iteration 2 value of p is: 0.007318032 
At iteration 3 value of p is: 0.006940548 
At iteration 4 value of p is: 0.006927551 
At iteration 5 value of p is: 0.006927104 
At iteration 6 value of p is: 0.006927089 
At iteration 7 value of p is: 0.006927088 
Algorithm converged, in : 7 iterations 
[1] 0.006927088
share|improve this answer
Thanks for the above. However as you can see the above code also is unable to locate the unstable equilibria under any parameter specifications. Under k=3 and gamma=7 the fixed points should be (0.08035, 0.3225, 097926) it seems to always miss out the middle one. – user1682980 Mar 7 '13 at 11:31
@user1682980 how do you know the result? how can I check this? – agstudy Mar 7 '13 at 11:34
just through a graphical test, the final code requires addition of a large number of covariates to the structure so this is just a simple loop to start with so that I can be certain that all fixed points are found, when there are multiple fixed points for certain parameter values. – user1682980 Mar 7 '13 at 11:37

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