# Solving univariate optimization problems simultaneously in R

I am going to use a very simple example to explain my problem (the real problem concerns a very complex univariate function). Consider the following univariate function

``````f <- function(x, p){ 10 - (x - p)^2 }
``````

where p belongs to {-500, -499,..., -1, 0, 1,..., 499, 500}.

I would like to find the value of x that maximizes f, for each value of p. This translates into 1001 values of x.

I know that one can do that in R-software with i) a for-loop, ii) a while-loop, iii) the function apply, and iv) the function foreach (doParallel package). However, I was wondering if you could tell me whether there is a more efficient way to solve the above optimization problem in R-software, please.

I know the above optimization problem is trivial to solve. However, the question focuses on an efficient procedure to solve several optimization problems simultaneously in R.

Thank you very much for your help.

The function `optimize()` can be used to get the maximum value of a function. Then, you can lapply over the values of the parameters as following:

``````p<-seq(-500,500,1)
fn <- function(param,p,...){return( 10 - (param - p)^2) }

ll <- lapply(pp,function(i)
optimize(f= fn,
par =c(-1000),
p=i,
interval = c(-100000000,1000000000),
maximum = TRUE))

ll[[which.max(sapply(ll,'[[','maximum'))]]
``````
• That's great. I will have a try with your suggestion. However, I have a question: what is the role of "par = c(-1000)" inside optimize function? Thank you. Jun 11, 2019 at 19:34
• Nice, if it works for your problems just mark the question as solved :). Answering your question: the role of `par = -1000` is just the initial value given to param (I just put that one randomly, you could have put whatever number), from which the optimization starts. It is important also to check the `method=` parameter to see the different types of existing optimizations. Cheers ! Jun 11, 2019 at 20:27