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Does anyone know of any optimization packages out there for R (similar to NUOPT for S+)?

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downvote for 'this question does not show any research effort' –  Spacedman Jan 6 '13 at 9:51
    
I "could" have made this a long question talking about the details of what I needed and how I had investigated linprog and found it wanting. Or I could just ask a very simple question. I stand by that decision. BTW, while I disagree with your reasons for downvoting me, at least you had the decency to give a reason. Thank you for your courtesy. –  wcm Jan 9 '13 at 21:02
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If you'd told us where you had looked then that would have shown some research effort - even a simple "i searched google or cran for ' optimisation' " would have helped. We shouldn't have to point people to cran task views... And if you'd found linprog wanting, why accept the answer that says "I've used linprog"? –  Spacedman Jan 9 '13 at 21:42
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It appears 3rd in google search under "linear optimization r", meaning we should be practical about it and use it as a reference for future searchers. –  Martín Bel Feb 11 at 23:43

5 Answers 5

up vote 1 down vote accepted

I have used linprog for linear problems in the past.

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+1 and thanks a lot. I haven' touched any optimization stuff since my TurboPascal days. There were a whole bunch of other optimization packages listed in the packages page (cran.r-project.org/web/packages). –  wcm Dec 11 '08 at 15:27

R has many, many packages for optimization; check the CRAN Task view on Optimization: http://cran.r-project.org/web/views/Optimization.html. Of course, for nonlinear programs, there is optim(), which is standard and includes Broyden-Fletcher-Goldfarb-Shanno's algorithm, and Nelder-Mead. It's a good first start.

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you should also try the Rglpk package solve LP problems with GLPK (GNU Linear Programming Kit).

An example:

## Simple linear program.
## maximize:   2 x_1 + 4 x_2 + 3 x_3
## subject to: 3 x_1 + 4 x_2 + 2 x_3 <= 60
##             2 x_1 +   x_2 +   x_3 <= 40
##               x_1 + 3 x_2 + 2 x_3 <= 80
##               x_1, x_2, x_3 are non-negative real numbers

obj <- c(2, 4, 3)
mat <- matrix(c(3, 2, 1, 4, 1, 3, 2, 2, 2), nrow = 3)
dir <- c("<=", "<=", "<=")
rhs <- c(60, 40, 80)
max <- TRUE

Rglpk_solve_LP(obj, mat, dir, rhs, max = max)

R output:
(Note that $status an integer with status information about the solution returned. If the control parameter canonicalize_status is set (the default) then it will return 0 for the optimal solution being found, and non-zero otherwise. If the control parameter is set to FALSE it will return the GLPK status codes).

$optimum
[1] 76.66667

$solution
[1]  0.000000  6.666667 16.666667

$status
[1] 0
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Try lpSolve with R.

A simple example:

# Maximize 
#   x1 + 9 x2 +   x3 
# Subject to: 
#   x1 + 2 x2 + 3 x3 <= 9
# 3 x1 + 2 x2 + 2 x3 <= 15
f.obj <- c(1, 9, 3)
f.con <- matrix(c(1, 2, 3, 3, 2, 2), nrow = 2, byrow = TRUE)
f.dir <- c("<=", "<=")
f.rhs <- c(9, 15)

lp("max", f.obj, f.con, f.dir, f.rhs)
lp("max", f.obj, f.con, f.dir, f.rhs)$solution
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Linprog, mentioned by Galwegian, focuses on linear programming via the simplex algorithm. In addition you may be interested in fPortfolio if you are doing portfolio optimization.

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