R help - Jul 2008 - optimize simultaneously two binomials inequalities using nlm

Dear R users,

I?m trying to optimize simultaneously two binomials inequalities used to
acceptance sampling, which are nonlinear solution, so there is no simple
direct solution. Please, let me explain shortly the the problem and the
question as following.

The objective is to obtain the smallest value of 'n' (sample size)
satisfying both inequalities: 

(1-alpha) <= pbinom(c, n, p1) && pbinom(c, n, p2) <= beta

Where p1 (AQL) and p2 (LTPD) are probabilities parameters (Consumer and
Producer), the alpha and beta are conumer and producer risks, and finally,
the 'n' represents the sample size and the 'c' an acceptance
number or
maximum number of defects (nonconforming) in sample size.

Considering that the 'n' and 'c' values are integer variables,
it is
commonly not possible to derive an OC curve including the both (p1,1-alpha)
and (p2,beta) points. Some adjacency compromise is commonly required,
achieved by searching a more precise OC curve with respect to one of the
points. 

I?m using Mathematica 6 but it is a Trial, so I would like use R intead (or
better, I need it)!

To exemplify,  In Mathematica I call the function using NMinimize passing
the restriction and parameters:

/* function name "findOpt" and parameters... */

restriction = (1 - alpha) <= CDF[BinomialDistribution[sample_n, p1], c] 
		&&  betha >= CDF[BinomialDistribution[sample_n, p2], c] 
		&&   0 < alpha < alphamax && 0 < betha < bethamax
		&&   1 < sample_n <= lot_Size   &&   0 <= c <
lot_size
		&&  p1 < p2 < p2max ;

fcost = 	sample_n/lot_Size; 

result = NMinimize[{fcost, restriction}, {sample_n, c, alpha, betha, p2max},
Method -> "NelderMead", AccuracyGoal -> 10];

/* Calling the function findOpt */
findOpt[p1=0.005, lot_size=1000, alphamax=0.05, bethamax =0.05, p2max 0.04]

/* and I got the return of values of; minimal "n", "c",
"alpha", "betha" and
the "p2" or (LTPD) were computed */ {0.514573, {alpha$74 ->
0.0218683,
sample_n$74 -> 155.231, betha$74 -> 0.05,
c$74 -> 2, p2$74 -> 0.04}}

Now, using R, I would define the "pbinom(c, n, prob)" given only the
minimum
and maximum values to "n" and "c" and limits to p1 and p2
probabilities
(Consumer and Producer), similar on the example above.  

I found some examples to optimize equations in R and some tips, but I not be
able to define the sintaxe to use with that functions. Among the functions
that could be used to resolve the problem presented, I found the function
optim() that it is used for unconstrained optimization and the nlm() which
is used for solving nonlinear unconstrained minimization problems. May I
wrong, but the nlm() function would be appropriate to solve this problem, is
it right?

Can I get a pointer to solve this problem using the nlm() function or where
could I get some tips/example to help me, please?


Thank you very much.

EToktar