**A, B, C, D**are random variables with known expected value and standard deviation.

I'd like to represent these variables discretely by finding a 6-dimensional vector (only one vector!) of probabilities and 6-dimensional vectors (one per random variable) of outcomes such that the probabilities sum to 1 and the probabilities combined with each outcome vector matches the EV and SD of the corresponding random variable.

So, the

**variables**we wish to determine are (p1, ...., p6) and (A1, ..., A6) and (C1, ..., C6) and so on.

The

**constraints**are p1 + ... + p6 = 1.

The

**objective**is to minimize the deviations of the means and standard deviations of our variables from the known parameters. So, for example, as you can see below, the known mean of A is 4.3, and therefore, we ought to minimize the square of the difference between 4.3 and p1A1 + ... p6A6.

The code is below. Please critique it, as it does not give the correct answer. All the solutions have distributions with zero standard deviation.

----------------------------------------------------------------------------------------

Sets

state / 1*6 /

randomvar / A, B, C, D/

alias(state, states);

Parameters

mean(randomvar) / A 4.33, B 5.91, C 7.61, D 8.09/

sd(randomvar) /A 0.94, B 0.82, C -0.75, D -0.74/;

Variables

prob(state)

valueofRV(randomvar, state)

z

;

Positive variables

prob;

Equations

cost

SumToOne;

SumToOne .. sum(state, prob(state)) =e= 1;

cost .. z =e= sum(randomvar, power(sum(state, prob(state)*valueofRV(randomvar, state)) - mean(randomvar),2)) + sum(randomvar, power(sqrt(sum(state, power(valueofRV(randomvar, state) - sum(states, valueofRV(randomvar, states)*prob(states)),2))) - sd(randomvar),2) );

Model moodel /all/;

Solve moodel using nlp minimizing z;