I've tried searching the other threads on this topic but none of the fixes are working for me. I have the results of a natural experiment and I want to show the number of consecutive occurrences of an event fit an exponential distribution. My R shell is pasted below

``````f <- function(x,a,b) {a * exp(b * x)}
> x
[1]  1  2  3  4  5  6  7  8  9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25
[26] 26 27
> y
[1] 1880  813  376  161  100   61   31    9    8    2    7    4    3    2    0
[16]    1    0    0    0    0    0    1    0    0    0    0    1
> dat2
x    y
1   1 1880
2   2  813
3   3  376
4   4  161
5   5  100
6   6   61
7   7   31
8   8    9
9   9    8
10 10    2
11 11    7
12 12    4
13 13    3
14 14    2
> fm <- nls(y ~ f(x,a,b), data = dat2, start = c(a=1, b=1))
Error in numericDeriv(form[[3L]], names(ind), env) :
Missing value or an infinity produced when evaluating the model
> fm <- nls(y ~ f(x,a,b), data = dat2, start = c(a=7, b=-.5))
Error in nls(y ~ f(x, a, b), data = dat2, start = c(a = 7, b = -0.5)) :
> fm <- nls(y ~ f(x,a,b), data = dat2, start = c(a=7,b=-.5),control=nls.control(maxiter=1000,warnOnly=TRUE,minFactor=1e-5,tol=1e-10),trace=TRUE)
4355798 :   7.0 -0.5
Warning message:
In nls(y ~ f(x, a, b), data = dat2, start = c(a = 7, b = -0.5),  :
``````

Please forgive the bad formatting, first post here. x contains bins of a histogram, y contains the number of occurrences of each bin in that histograms. dat2 cuts off at 14 since the 0 count bins would throw off the exponential regression, and I really only need to fit those first 14. Those bins which have counts beyond 14 I have biological reason to believe they are special. The issue I initially got was infinity, which I don't get since none of the values are 0. After giving decent starting values as suggested by a different post here I get the singular gradient error. The only other posts I saw with that had more variables, I tried increasing the number of iterations but that did not succeed. Any help is appreciated. A

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You need better starting values:

``````> # compute starting values, st
> st <- coef(nls(log(y) ~ log(f(x, a, b)), dat2, start = c(a = 1, b = 1)))
>
> nls(y ~ f(x, a, b), dat2, start = st)
Nonlinear regression model
model: y ~ f(x, a, b)
data: x
a         b
4214.4228   -0.8106
residual sum-of-squares: 2388

Number of iterations to convergence: 6
Achieved convergence tolerance: 3.363e-06
``````
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Thanks, had tried to compute the coefficients using the y ~ aexp(bx) before and was receiving an error, taking the log excellent way to compute starting values, thanks! – sessmurda Aug 21 '13 at 18:22
Just out of interest, is "bootstrapping" the initial conditions by way of log(function) a standard method in general or just for exponential functions? – Carl Witthoft Aug 21 '13 at 18:55
The motivation for `log` was to transform it to be linear in `log(a)` and `b` and linear functions are easy to optimize. – G. Grothendieck Aug 21 '13 at 19:08
OK, got it. Could have done `st<-exp(coef(lm(y~x,dat2)))` but that I think ends up w/ more error in the calc. – Carl Witthoft Aug 21 '13 at 19:43
With `lm` the intercept must be transformed which adds a step and is why I did not try that first; however, had taking the log of both sides not been sufficient `lm` would have been the next thing to try. – G. Grothendieck Aug 21 '13 at 19:46