I am new to using R and portfolio optimization. I am trying to optimize a portfolio with 7 assets such that asset number 3 and 4 have a minimum weight of 0.35 each and the sum of all 7 assets equal to 1. Following is the code I have tried:

```
library(quadprog)
dmat <- cov(dr) #dr stores the daily return of the 7 assets and is a timeSeries object
dvec <- colMeans(dr)
c1 <- c(0,0,1,0,0,0,0)
c2 <- c(0,0,0,1,0,0,0)
amat <- t(rbind(matrix(1, ncol = ncol(dmat)), c1, c2)) #used transpose because earlier when I didn't use the transpose I got an error saying amat and dvec are not compatible
bvec <- matrix(c(1,0.35, 0.35), nrow =3)
meq <- 1
sol <- solve.QP(dmat, dvec, amat, bvec, meq)
```

Here is the answer that I get from the above code:

```
$solution
[1] -0.01619018 -2.10640140 0.35000000 0.35000000 -0.82522310 1.27499728 1.97281741
$value
[1] -0.0007364101
$unconstrained.solution
[1] 0.026872891 12.595238193 -0.256430652 0.008918392 0.743618974 2.212816019 3.749097189
$iterations
[1] 4 0
$Lagrangian
[1] 0.0002874682 0.0002846590 0.0003015167
$iact
[1] 1 3 2
```

Since the solution has weights for 2 assets in excess of 1, I must have made a mistake in the Amat or bvec or meq. However, I am unable to figure out what is that mistake.

Could someone guide me on how to construct those matrices to tackle this problem? Thanks in advance for any help.