R optimization with fixed sum of parameters

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

-
`?optim` to start with, maybe. –  Carl Witthoft Apr 16 '13 at 11:45
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
@baptiste I was thinking the same, but how would you specify a lower limit for c? –  Roland Apr 16 '13 at 12:38

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))

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
)
``````
-

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.

-

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))
``````
-
`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 '14 at 8:52