Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I would like to find all local minimums of the following objective function

func <- function(b){Mat=matrix(c(+0.5*1/((1/(exp(-b[1]-b[2]*-5)+1))*(1-(1/(exp(-b[1]-b[2]*-5)+1))))*exp(-b[1] - b[2] * -5)/(exp(-b[1] - b[2] * -5) + 1)^2*exp(-b[1] - b[2] * -5)/(exp(-b[1] - b[2] * -5) + 1)^2+0.5*1/((1/(exp(-b[1]-b[2]*5)+1))*(1-(1/(exp(-b[1]-b[2]*5)+1))))*exp(-b[1] - b[2] * 5)/(exp(-b[1] - b[2] * 5) + 1)^2*exp(-b[1] - b[2] * 5)/(exp(-b[1] - b[2] * 5) + 1)^2,+0.5*1/((1/(exp(-b[1]-b[2]*-5)+1))*(1-(1/(exp(-b[1]-b[2]*-5)+1))))*exp(-b[1] - b[2] * -5) * -5/(exp(-b[1] - b[2] * -5) + 1)^2*exp(-b[1] - b[2] * -5)/(exp(-b[1] - b[2] * -5) + 1)^2+0.5*1/((1/(exp(-b[1]-b[2]*5)+1))*(1-(1/(exp(-b[1]-b[2]*5)+1))))*exp(-b[1] - b[2] * 5) * 5/(exp(-b[1] - b[2] * 5) + 1)^2*exp(-b[1] - b[2] * 5)/(exp(-b[1] - b[2] * 5) + 1)^2,+0.5*1/((1/(exp(-b[1]-b[2]*-5)+1))*(1-(1/(exp(-b[1]-b[2]*-5)+1))))*exp(-b[1] - b[2] * -5)/(exp(-b[1] - b[2] * -5) + 1)^2*exp(-b[1] - b[2] * -5) * -5/(exp(-b[1] - b[2] * -5) + 1)^2+0.5*1/((1/(exp(-b[1]-b[2]*5)+1))*(1-(1/(exp(-b[1]-b[2]*5)+1))))*exp(-b[1] - b[2] * 5)/(exp(-b[1] - b[2] * 5) + 1)^2*exp(-b[1] - b[2] * 5) * 5/(exp(-b[1] - b[2] * 5) + 1)^2,+0.5*1/((1/(exp(-b[1]-b[2]*-5)+1))*(1-(1/(exp(-b[1]-b[2]*-5)+1))))*exp(-b[1] - b[2] * -5) * -5/(exp(-b[1] - b[2] * -5) + 1)^2*exp(-b[1] - b[2] * -5) * -5/(exp(-b[1] - b[2] * -5) + 1)^2+0.5*1/((1/(exp(-b[1]-b[2]*5)+1))*(1-(1/(exp(-b[1]-b[2]*5)+1))))*exp(-b[1] - b[2] * 5) * 5/(exp(-b[1] - b[2] * 5) + 1)^2*exp(-b[1] - b[2] * 5) * 5/(exp(-b[1] - b[2] * 5) + 1)^2),2,2);d=(det(Mat));return(d)}

'func' is determinant of Fisher information matrix of Logistic regression model and is a function of parameters b1 and b2 where b1 belongs to [-.3, .3] and b2 to [6, 8]

Suppose these two initial values for b = c(b1, b2)

> in1 <- c(-0.04785405, 6.42711047)
> in2 <- c(0.2246729, 7.5211575)

The local minimum with initial value in1 is:

> optim(in1, fn = func, lower = c(-.3, 6), upper = c(.3, 8), method = "L-BFGS-B")

$par
[1] -0.04785405  6.42711047

$value
[1] 3.07185e-27

$counts
function gradient 
   1        1 

$convergence
[1] 52

$message
[1] "ERROR: ABNORMAL_TERMINATION_IN_LNSRCH"

As can be seen in the $massage a termination happened in optimization process and minimum could not be computed and optim returned in1 as local optima.

For 'in2' also an error is appeared:

> optim(in2, fn = func, lower = c(-.3, 6), upper = c(.3, 8), method = "L-BFGS-B")

Error in optim(in2, fn = func, lower = c(-0.3, 6), upper = c(0.3, 8),  : 
L-BFGS-B needs finite values of 'fn'

This error happened because the value of func for in2' isNaN`:

> func(in2)
[1] NaN

However for in1 the value of objective function at in1 is calculated but the optimization is terminated because optim could not continue the calculation for another intial values:

> func(in1)
[1] 3.07185e-27

Let me define func without det and just as matrix to see what happened:

Mat.func <- function(b){Mat=matrix(c(+0.5*1/((1/(exp(-b[1]-b[2]*-5)+1))*(1-(1/(exp(-b[1]-b[2]*-5)+1))))*exp(-b[1] - b[2] * -5)/(exp(-b[1] - b[2] * -5) + 1)^2*exp(-b[1] - b[2] * -5)/(exp(-b[1] - b[2] * -5) + 1)^2+0.5*1/((1/(exp(-b[1]-b[2]*5)+1))*(1-(1/(exp(-b[1]-b[2]*5)+1))))*exp(-b[1] - b[2] * 5)/(exp(-b[1] - b[2] * 5) + 1)^2*exp(-b[1] - b[2] * 5)/(exp(-b[1] - b[2] * 5) + 1)^2,+0.5*1/((1/(exp(-b[1]-b[2]*-5)+1))*(1-(1/(exp(-b[1]-b[2]*-5)+1))))*exp(-b[1] - b[2] * -5) * -5/(exp(-b[1] - b[2] * -5) + 1)^2*exp(-b[1] - b[2] * -5)/(exp(-b[1] - b[2] * -5) + 1)^2+0.5*1/((1/(exp(-b[1]-b[2]*5)+1))*(1-(1/(exp(-b[1]-b[2]*5)+1))))*exp(-b[1] - b[2] * 5) * 5/(exp(-b[1] - b[2] * 5) + 1)^2*exp(-b[1] - b[2] * 5)/(exp(-b[1] - b[2] * 5) + 1)^2,+0.5*1/((1/(exp(-b[1]-b[2]*-5)+1))*(1-(1/(exp(-b[1]-b[2]*-5)+1))))*exp(-b[1] - b[2] * -5)/(exp(-b[1] - b[2] * -5) + 1)^2*exp(-b[1] - b[2] * -5) * -5/(exp(-b[1] - b[2] * -5) + 1)^2+0.5*1/((1/(exp(-b[1]-b[2]*5)+1))*(1-(1/(exp(-b[1]-b[2]*5)+1))))*exp(-b[1] - b[2] * 5)/(exp(-b[1] - b[2] * 5) + 1)^2*exp(-b[1] - b[2] * 5) * 5/(exp(-b[1] - b[2] * 5) + 1)^2,+0.5*1/((1/(exp(-b[1]-b[2]*-5)+1))*(1-(1/(exp(-b[1]-b[2]*-5)+1))))*exp(-b[1] - b[2] * -5) * -5/(exp(-b[1] - b[2] * -5) + 1)^2*exp(-b[1] - b[2] * -5) * -5/(exp(-b[1] - b[2] * -5) + 1)^2+0.5*1/((1/(exp(-b[1]-b[2]*5)+1))*(1-(1/(exp(-b[1]-b[2]*5)+1))))*exp(-b[1] - b[2] * 5) * 5/(exp(-b[1] - b[2] * 5) + 1)^2*exp(-b[1] - b[2] * 5) * 5/(exp(-b[1] - b[2] * 5) + 1)^2),2,2);d=Mat;return(d)}

We get

         > Mat.func(in1)
              [,1]         [,2]
         [1,] 1.109883e-14 2.784007e-15
         [2,] 2.784007e-15 2.774708e-13

        > Mat.func(in2)
              [,1] [,2]
          [1,]  Inf  Inf
          [2,]  Inf  Inf

Hence, by double precision, values of Mat.func(in2) elements are Inf. I also rewrite Mat.func with mpfr function:

Mat.func.mpfr <-function(b, prec){ d=c(+0.5*1/((1/(exp(-mpfr(b[1], precBits = prec)-mpfr(b[2], precBits = prec)*-5)+1))*(1-(1/(exp(-mpfr(b[1], precBits = prec)-mpfr(b[2], precBits = prec)*-5)+1))))*exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * -5)/(exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * -5) + 1)^2*exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * -5)/(exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * -5) + 1)^2+0.5*1/((1/(exp(-mpfr(b[1], precBits = prec)-mpfr(b[2], precBits = prec)*5)+1))*(1-(1/(exp(-mpfr(b[1], precBits = prec)-mpfr(b[2], precBits = prec)*5)+1))))*exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * 5)/(exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * 5) + 1)^2*exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * 5)/(exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * 5) + 1)^2,
                                   +0.5*1/((1/(exp(-mpfr(b[1], precBits = prec)-mpfr(b[2], precBits = prec)*-5)+1))*(1-(1/(exp(-mpfr(b[1], precBits = prec)-mpfr(b[2], precBits = prec)*-5)+1))))*exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * -5) * -5/(exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * -5) + 1)^2*exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * -5)/(exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * -5) + 1)^2+0.5*1/((1/(exp(-mpfr(b[1], precBits = prec)-mpfr(b[2], precBits = prec)*5)+1))*(1-(1/(exp(-mpfr(b[1], precBits = prec)-mpfr(b[2], precBits = prec)*5)+1))))*exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * 5) * 5/(exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * 5) + 1)^2*exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * 5)/(exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * 5) + 1)^2,
                                   +0.5*1/((1/(exp(-mpfr(b[1], precBits = prec)-mpfr(b[2], precBits = prec)*-5)+1))*(1-(1/(exp(-mpfr(b[1], precBits = prec)-mpfr(b[2], precBits = prec)*-5)+1))))*exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * -5)/(exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * -5) + 1)^2*exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * -5) * -5/(exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * -5) + 1)^2+0.5*1/((1/(exp(-mpfr(b[1], precBits = prec)-mpfr(b[2], precBits = prec)*5)+1))*(1-(1/(exp(-mpfr(b[1], precBits = prec)-mpfr(b[2], precBits = prec)*5)+1))))*exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * 5)/(exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * 5) + 1)^2*exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * 5) * 5/(exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * 5) + 1)^2,
                                   +0.5*1/((1/(exp(-mpfr(b[1], precBits = prec)-mpfr(b[2], precBits = prec)*-5)+1))*(1-(1/(exp(-mpfr(b[1], precBits = prec)-mpfr(b[2], precBits = prec)*-5)+1))))*exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * -5) * -5/(exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * -5) + 1)^2*exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * -5) * -5/(exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * -5) + 1)^2+0.5*1/((1/(exp(-mpfr(b[1], precBits = prec)-mpfr(b[2], precBits = prec)*5)+1))*(1-(1/(exp(-mpfr(b[1], precBits = prec)-mpfr(b[2], precBits = prec)*5)+1))))*exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * 5) * 5/(exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * 5) + 1)^2*exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * 5) * 5/(exp(-mpfr(b[1], precBits = prec) - mpfr(b[2], precBits = prec) * 5) + 1)^2)
                               Mat = new("mpfrMatrix", d, Dim = c(2L, 2L))
                               return(Mat)}

Thus:

require(Rmpfr)
> Mat.func.mpfr(c(in1), prec = 54)
'mpfrMatrix' of dim(.) =  (2, 2) of precision  54   bits 
     [,1]                   
 [1,] 1.10988301365972506e-14
 [2,] 2.78400749725484580e-15
      [,2]                   
 [1,] 2.78400749725484580e-15
 [2,] 2.77470753414931256e-13

 > Mat.func.mpfr(c(in2), prec = 54)
 'mpfrMatrix' of dim(.) =  (2, 2) of precision  54   bits 
      [,1] [,2]
 [1,]  Inf  Inf
 [2,]  Inf  Inf

 > Mat.func.mpfr(c(in2), prec = 55)
 'mpfrMatrix' of dim(.) =  (2, 2) of precision  55   bits 
      [,1]                    
 [1,]  4.16032108702067276e-17
 [2,] -8.34300174643550123e-17
      [,2]                    
 [1,] -8.34300174643550154e-17
 [2,]  1.04008027175516816e-15

So by precision 55 the values of matrix elements are not Inf anymore. unfortunately, mpfr function changes the class of an objective and nor det neither r optimization functions can not be applied, to clarify I provide two examples:

> class(mpfr (1/3, 54))
[1] "mpfr"
attr(,"package")
[1] "Rmpfr"

## determinant
example1 <- function(x){
  d <- c(mpfr(x, prec = 54), 3 * mpfr(x, prec = 54), 5 * mpfr(x, prec = 54), 7 * mpfr(x, prec = 54))
  Mat = new("mpfrMatrix", d, Dim = c(2L, 2L))
  return(det(Mat))
}

> example1(2)
Error in UseMethod("determinant") : 
no applicable method for 'determinant' applied to an object of class "c('mpfrMatrix',    'mpfrArray', 'Mnumber', 'mNumber', 'mpfr', 'list', 'vector')"

##optimization 
example2 <- function(x)  ## Rosenbrock Banana function
   100 * (mpfr(x[2], prec = 54) - mpfr(x[1], prec = 54) * mpfr(x[1], prec = 54 ))^2 + (1 - mpfr(x[1], prec = 54))^2

> example2(c(-1.2, 1))
1 'mpfr' number of precision  54   bits 
[1] 24.1999999999999957
> optim(c(-1.2,1), example2)
Error in optim(c(-1.2, 1), example2) : 
(list) object cannot be coerced to type 'double'

Hence, using mpfr could not solve the problem.

To find All the local minimums, an algorithm which applies different random initial values should be written. But as can be seen, for some initial values the function produces NaN (ignorance of these values would not be a good idea because it may generally results in missing some local minimums ,specially for functions that have lots of local optima).

I was wondering if there is any R package that can carry on optimization process with arbitrary precision to avoid NaN for objective functions?

Thank you

share|improve this question
1  
you might be able to reformulate your objective function to get fewer NaN values (e.g. by rearranging to minimize the possibility of underflow/overflow) –  Ben Bolker Jan 28 '13 at 1:27
    
So you are trying to minimize log(det(some_matrix)). 1) You get NaN whenever det(some_matrix) < 0 because log(x) is not defined for x < 0; what meaning do you give to that? 2) The optimizer will try to find where det(some_matrix) == 0; maybe changing your objective to abs(det(some_matrix)) will fix the asymptotic behavior. It's hard to say what you are trying to do. –  flodel Jan 28 '13 at 1:33
    
@flodel actually I tried it without log, but the answer was same. sorry the value of func(in1) and func(in2) that I wrote in the question are for det(some_matrix) and not log(det(some_matrix)) I removed log –  Ehsan Masoudi Jan 28 '13 at 6:48
add comment

5 Answers 5

up vote 3 down vote accepted

I think the answer (I think 'agstudy' gave, too) is: Make sure that the function you minimize does NOT return NaN (or NA) but rather +Inf (if you minimize, or -Inf if you maximize).

2nd: Instead of log(det(.)) you REALLY should use
{ r <- determinant(., log=TRUE) ; if(r$sign <= 0) -Inf else r$modulus }

which is also more accurate. {Hint: do look how det is defined in R !}

Now to Rmpfr, I will reply separately. It should work like standard R to use "mpfr"-numbers, .... says the author of Rmpfr .... but you may need a bit of care. tryCatch() should not be needed, however.

share|improve this answer
add comment

Answering your problem, using the Rmpfr - produced matrix: (not quite efficiently though ...!...):

Yes, determinant() is not available for mpfr-matrices, however you can simply use something like

M <- Mat.func.mpfr(in2, prec = 55)
m <- as(M, "matrix")
ldm <- determinant(m) # is already  log() !

and then use the

 { r <- determinant(., log=TRUE) ; if(r$sign <= 0) -Inf else r$modulus }

I've mentioned above ... something much better than the ``wrong by design'' use of log(det(.))

share|improve this answer
add comment

Using mpfr can be useful to avoid computationally NaN in a function (and also halt in optimization algorithm). But mpfr output is an 'mpfr' class and some R functions (such as optim and det) may not work with this kind of class. As usual as.numeric can be applied to convert 'mpfr' class to a 'numeric' one.

exp(9000)
[1] Inf

require(Rmpfr)
number <- as.numeric(exp(mpfr(9000, prec = 54)))

class(number)
[1] "numeric"

round(number)
[1] 1.797693e+308

number * 1.797692e-308
[1] 3.231699

number * 1.797693e-307
[1] 32.317

number * (1/number)
[1] 1

number * .2
[1] 3.595386e+307

number * .9
[1] 1.617924e+308

number * 1.1
[1] Inf

number * 2
[1] Inf

number / 2
[1] 8.988466e+307

number + 2
[1] 1.797693e+308

number + 2 * 10 ^ 291
[1] 1.797693e+308

number + 2 * 10 ^ 292
[1] Inf

number - 2
[1] 1.797693e+308

number - 2 * 10 ^ 307
[1] 1.597693e+308

number - 2 * 10 ^ 308
[1] -Inf

Now consider the following matrix function:

mat <- function(x){
x1 <- x[1]
x2 <- x[2]
d = matrix(c(exp(5 * x1+ 4 * x2), exp(9 * x1), exp(2 * x2 + 4 * x1),
           exp(3 * x1)), 2, 2)
         return(d)
}

elements of this matrix is highly potential to produce Inf:

mat(c(300, 1))
    [,1] [,2]
[1,]  Inf  Inf
[2,]  Inf  Inf

So if det was returned in function environment, instead of a numeric result we got NaN and the optim function would definitely be terminated. To solve this problem the determinant of this function is written by mpfr:

func <- function (x){
  x1 <- mpfr(x[1], prec = precision)
  x2 <- mpfr(x[2], prec = precision)
  mat <- new("mpfrMatrix",c(exp(5 * x1+ 4 * x2), exp(9 * x1), exp(2 * x2 + 4 * x1),   exp(3 * x1)), Dim = c(2L,2L))
  d <- mat[1, 1] * mat[2, 2] - mat[2, 1] * mat[1, 2]
  return(as.numeric(-d))
}

then for x1 = 3 and x2 = 1 we have:

func(c(3,1))
[1] 6.39842e+17

optim(c(3, 1),func)

$par
[1] 0.4500 1.4125

$value
[1] -4549.866

$counts
function gradient 
  13       NA 

$convergence
[1] 0

$message
NULL

and for x1 = 300 and x2 = 1:

func(c(300,1))
[1] 1.797693e+308

optim(c(300, 1),func)
$par
[1] 300   1

$value
[1] 1.797693e+308

$counts
function gradient 
   3       NA 

$convergence
[1] 0

$message
NULL

As can bee seen, there is no halt and even optim claimes a convergence in the optimization process. However, it seems that there are no iterations and optim just returned the initial values as local minimums (definitely, 1.797693e+308 is not a local minimum of this function!!). In such these situations, applying mpfr can just prevent termination of optimization process, but if we really expect optimization algorithm to start from such this points which their values are Inf by R double-precision and continue the iteration to reach the local minimums, besides defining a function with 'mpfr' class, the optimization function also should have this ability to work with 'mpfr' class.

share|improve this answer
1  
Feel free to write an add-on package that does this. One difficulty is that most of R's optimizers use lower-level (C or FORTRAN) code internally, which will not easily be adaptable to using mfpr. One thought would be that you could try some of the optimizers in the optimx package, which have "pure-R" versions of conjugate gradient and quasi-Newton methods which might work mfpr objects. –  Ben Bolker Jan 29 '13 at 15:31
    
@Ben Bolker actually I would like to write this package and I also have chosen an appropriate package called Rsolnp which is pure-R and is based on a Matlab code. –  Ehsan Masoudi Jan 29 '13 at 15:51
add comment

I tried to reformulate your horrible(sorry for the term) objective function. I am pretty sure that w we can find with simpler form. Hope that others can use this to find a solution to your optimization problem...

func1 <- function(b){
  A <- exp(-b[1]+5*b[2])
  C <- exp(-b[1]-5*b[2])
  A1 <- A + 1
  C1 <- C + 1
  D <- 1/A1
  H <- 1/C1
  K <- D*(1-D)
  J <- H*(1-H)
  M <- (A/A1^2)^2/K
  N <- (C/C1^2)^2/J


Mat <- matrix(c( 1 *M    + 1  *N,
                -5 *M    + 5  *N,
                -5 *M    + 5  *N,
                25 *M    + 25 *N),2,2)

  Mat <- 0.5*Mat
  d <- log(det(Mat))
  return(d)
}

EDIT

As I said you can simplify again your function. It looks much better

func1 <- function(b){
  A <- exp(-b[1]+5*b[2])
  C <- exp(-b[1]-5*b[2])
  A1 <- A + 1
  C1 <- C + 1
  M <- A/A1^2
  N <- C/C1^2
  det.Mat <-25*M*N
  log(det.Mat)
}

Here some tests between the 2 functions.

func1(c(1,2))
[1] -16.7814
> func1(c(8,2))
[1] -17.03498
> func1(c(10,2))
[1] -18.16742
> func(c(10,2))
[1] -18.16742
> func(c(10,5))
[1] -46.83608

The reformulation minimized the possibility of underflow/overflow ( can't store the intermediate result in the register)..that's why we get Inf and not NA(see below) , which is infinite but still a numeric, suitable for farther computing in opposition to NaN which is like an NA values..

func(c(10,100))
[1] NaN func1(c(10,100)) [1] -Inf

Now I test your optimization instruction, on the simpler form , and it converges as you can see:

in1 <- c(-0.04785405, 6.42711047)
in2 <- c(0.2246729, 7.5211575)
ll <- optim(in1, fn = func1, lower = c(-.3, 6), upper = c(.3, 8), method = "L-BFGS-B")
 do.call(rbind,ll)


            function                                           gradient                                          
par         "-0.04785405"                                      "8"                                               
value       "-76.7811241751318"                                "-76.7811241751318"                               
counts      "2"                                                "2"                                               
convergence "0"                                                "0"                                               
message     "CONVERGENCE: NORM OF PROJECTED GRADIENT <= PGTOL" "CONVERGENCE: NORM OF PROJECTED GRADIENT <= PGTOL"

same thing for in2

optim(in2, fn = func1, lower = c(-.3, 6), upper = c(.3, 8), method = "L-BFGS-B")
$par
[1] 0.2246729 8.0000000

$value
[1] -76.78112

$counts
function gradient 
       2        2 

$convergence
[1] 0

$message
[1] "CONVERGENCE: NORM OF PROJECTED GRADIENT <= PGTOL"
share|improve this answer
    
I agree that the formulate of my function is horrible and thank you for your modification. actually, I did not write it!! in fact I applied functions gsub, Dand paste to construct the information matrix for all nonlinear models without user-interfere and the formulate that you saw is auto-constructed. –  Ehsan Masoudi Jan 28 '13 at 7:03
    
@EhsanMasoudi ok but when you ask an answer here you have to do more effort..or at least give us how you have do to have such function...That 's said I update my answer for more simple function. –  agstudy Jan 28 '13 at 11:50
    
I would appreciate if you could explain why func(c(10, 100)) is "Nan" but func(c(10, 100)) is `-Inf' –  Ehsan Masoudi Jan 28 '13 at 13:56
1  
I add some explanation...It is my interpretation of things..I am not a numeric specialist.. –  agstudy Jan 28 '13 at 14:17
add comment

For arb precision: gmp and / or Rmpfr . You might be better off with some tryCatch in your code instead, though (to avoid crashes when a given attempt causes that NaN error)

share|improve this answer
    
I edited the question with Rmpfr and as can be seen it could not be useful. Also, as i said ignoring NaN by tryCathch may leads to missing some local minimums. –  Ehsan Masoudi Jan 28 '13 at 9:08
add comment

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.