The custom design guarantees that the parameters in your model are estimable. So the 12 runs are a sufficient number of runs. The matter of the number of runs affects the standard errors of these estimates by increasing sample size and potentially decreasing (eliminating?) correlations.

If you specify a larger number of runs (e.g., 24), then custom design will use the bigger budget optimally. If you force JMP to replicate runs (2x12) to achieve the same number of runs, the design might not be as good. In other words, the design that you get by asking for n runs will not be same same design that you get if you replicate a runs b times such that axb = n runs and a minimum amount of replication.

A full factorial design for a 4-level factor and two 3-level factors contains 24 unique treatments. So your design with 12 runs is a half fractional factorial design.

You can use the DOE > Classical > Full Factorial Design, the enter the number of desired replicates. The design (24 runs) counts as 1 replicate. If you enter 1 for the number of replicates, you get another one for a total of 2 replicates (48 runs).

You can use DOE > Custom Design. Just enter the total number of runs (e.g., 48 runs for 2 replicates) to include all the replicates that you want. The custom design will produce the optimal design, which will be the full factorial design in this case.

So you should be able to get the (4x3x3) x Replicates either way.

@moughli, I had some other thoughts about your situation if you'll indulge me.  I'm not sure why you are running experiments on factors at more than 2 levels if you are wanting a fractional factorial.  You are likely to confound higher order linear effects (2nd+ order interactions) with non-linear effects (quadratic and cubic).  

Some thoughts:

1. Perhaps you should think of the factors as ratios of each component (if indeed you need all components in the final solution),

2. You might want to think about a mixture design, but only after you have identified, studied and understand the noise,

3. Seems there is likely interaction between the factors and the noise (amount of each ingredient depends on the current soil conditions), so it is paramount that you understand these before optimizing the levels of the controllable factors.

4. I might suggest understanding the first order model for the factors of interest (2 level designs are adequate for this) and identifying noise-by-factor interactions before proceeding with response surface type designs.