I would like to set the constraints for `constrOptim`

to optimize the following function:

```
logistic<-function(b,x,target){
b1<-b[1]
b2<-b[2]
log<-function(x){1/(1+exp(-(b1+b2*x)))}
abs(mean(log(x))-target)
}
```

Optimization to `target=.75`

can generally be done using

```
optim(c(1,1),logistic,x=data,target=.75,hessian=TRUE,method='SANN')
```

Method SANN seems necessary, as the function is not differentiable.

The constraint is that b2>0 (condition 1) or b2<0 (condition 2), while b1 can be any real number. But how can I extend this function to `constrOptim`

? Specifically, I do not know how to specify arguments `ui`

and `ci`

.

Alternative approaches to optimization under these constraints also welcome. Thanks.

**EDIT**
I think that I found a workarround. We find constraint b2<0 by redefining `logistic`

to

```
logistic_lt<-function(b,x,target){
b1<-b[1]
b2<-b[2]
if(b2>0){b2<-b2*(-1)}
log<-function(x){1/(1+exp(-(b1+b2*x)))}
abs(mean(log(x))-target)
}
```

Still I'd be interested in a solution involving constrOptim.

`constrOptim`

since you use a sort of a logical constraint and non linear one ( imaginary == 0) – agstudy Apr 18 '13 at 15:52`b2>0`

constraint, one with the`b2<0`

constraint, and take the best solution. To impose those constraints, you can reparametrize the problem, e.g., by replacing`b2`

with`log(1+exp(b2))`

(that is a logarithm, not your user-defined`log`

function), which is always positive.`SANN`

is probably not a good choice: it is the slowest optimization algorithm available -- if you minimize the square of the difference, instead of its absolute value, the other algorithms should give a correct result. – Vincent Zoonekynd Apr 18 '13 at 16:35