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i want to optimize one function, with the sum of parameters set to 1 here there is the function

varxyz<-function(param){
a<-param[1]
b<-param[2]
c<-param[3]
a^2*matcov[1,1]+b^2*matcov[2,2]+c^2*matcov[3,3]+2*a*b*matcov[1,2]+2*a*c*matcov[1,3]+2*b*c*matcov[2,3]   
}  


parammv <- optim(c(0.3,0.3,0.4),varxyz,method="L-BFGS-B",lower=c(0.1,0.1,0.1))

where matcov is the covariance matrix

How can I set the sum of the three parameters to 1? Thanks for answers

share|improve this question
    
?optim to start with, maybe. –  Carl Witthoft Apr 16 '13 at 11:45
3  
optimize with only 2 parameters, the third one being fixed as c = 1 - (a + b) –  baptiste Apr 16 '13 at 11:56
    
You're looking for constrOptim, take a look at ui and ci arguments. For further details see ?constrOptim. –  Jilber Apr 16 '13 at 12:04
    
@Jilber ConstrOptim ? but how to set constraint =1? maybe by giviging 2 constraints >= 1 and <=1 , but I dont'think you can get a feasible solution. baptiste suggestion seems to be the solution here. –  agstudy Apr 16 '13 at 12:08
1  
@baptiste I was thinking the same, but how would you specify a lower limit for c? –  Roland Apr 16 '13 at 12:38

3 Answers 3

Since it is a quadratic optimization problem, you can use quadprog.

# Sample data
n <- 3
matcov <- var(matrix(rnorm(2*n^2),2*n,n))

library(quadprog)
solve.QP(matcov, rep(0,n), matrix(1,nc=1,nr=n), 1, meq=1)

# With lower- and upper-bound constraints:
solve.QP(
  matcov, rep(0,n), 
  cbind( 
    rep(1,n),  # Equality constraint
    diag(n),   # Lower bound constraint
    -diag(n)   # Upper bound constraint
  ),
  c(
    1,         # Equality constraint RHS
    rep(.1,n), # Lower bound
    rep(-1,n)  # - Upper bound
  ),
  meq = 1      # The first constraint is an equality
)
share|improve this answer

Try this

proj <- function(x) x / sum(x)

varxyz <- function(param) {
   param <- proj(param)
   ... rest of function as it is now ...
}

After performing the optimization apply proj to the solution from optim to get the answer.

You might also want to look into the spg function in the BB package as it supports projections natively.

share|improve this answer

Using the sugestion of @baptiste and imposing a minimal value to c (0.1) via ifelse:

matcov <- var(matrix(rnorm(12),4,3))
varxyz<-function(param){
 a<-param[1]
 b<-param[2]
 c<-1-(a+b)
 ifelse(c >= 0.1,a^2*matcov[1,1]+b^2*matcov[2,2]+c^2*matcov[3,3]+2*a*b*matcov[1,2]+2*a*c*matcov[1,3]+2*b*c*matcov[2,3],-Inf)
}  


parammv <- optim(c(0.3,0.3),varxyz,method="L-BFGS-B",lower=c(0.1,0.1))
share|improve this answer
    
Error in optim(c(0.3, 0.3), varxyz, method = "L-BFGS-B", lower = c(0.1, : L-BFGS-B needs finite values of 'fn' –  user2763361 May 12 at 8:52

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