I have worked out a Java code similar to that of Dan Dyer (referenced earlier). My roulette-wheel, however, selects a single element based on a probability vector (input) and returns the index of the selected element.
Having said that, the following code is more appropriate if the selection size is unitary and if you do not assume how the probabilities are calculated and zero probability value is allowed. The code is self-contained and includes a test with 20 wheel spins (to run).

```
import java.util.ArrayList;
import java.util.Arrays;
import java.util.List;
import java.util.Random;
import java.util.logging.Level;
import java.util.logging.Logger;
/**
* Roulette-wheel Test version.
* Features a probability vector input with possibly null probability values.
* Appropriate for adaptive operator selection such as Probability Matching
* or Adaptive Pursuit, (Dynamic) Multi-armed Bandit.
* @version October 2015.
* @author Hakim Mitiche
*/
public class RouletteWheel {
/**
* Selects an element probabilistically.
* @param wheelProbabilities elements probability vector.
* @param rng random generator object
* @return selected element index
* @throws java.lang.Exception
*/
public int select(List<Double> wheelProbabilities, Random rng)
throws Exception{
double[] cumulativeProba = new double[wheelProbabilities.size()];
cumulativeProba[0] = wheelProbabilities.get(0);
for (int i = 1; i < wheelProbabilities.size(); i++)
{
double proba = wheelProbabilities.get(i);
cumulativeProba[i] = cumulativeProba[i - 1] + proba;
}
int last = wheelProbabilities.size()-1;
if (cumulativeProba[last] != 1.0)
{
throw new Exception("The probabilities does not sum up to one ("
+ "sum="+cumulativeProba[last]);
}
double r = rng.nextDouble();
int selected = Arrays.binarySearch(cumulativeProba, r);
if (selected < 0)
{
/* Convert negative insertion point to array index.
to find the correct cumulative proba range index.
*/
selected = Math.abs(selected + 1);
}
/* skip indexes of elements with Zero probability,
go backward to matching index*/
int i = selected;
while (wheelProbabilities.get(i) == 0.0){
System.out.print(i+" selected, correction");
i--;
if (i<0) i=last;
}
selected = i;
return selected;
}
public static void main(String[] args){
RouletteWheel rw = new RouletteWheel();
int rept = 20;
List<Double> P = new ArrayList<>(4);
P.add(0.2);
P.add(0.1);
P.add(0.6);
P.add(0.1);
Random rng = new Random();
for (int i = 0 ; i < rept; i++){
try {
int s = rw.select(P, rng);
System.out.println("Element selected "+s+ ", P(s)="+P.get(s));
} catch (Exception ex) {
Logger.getLogger(RouletteWheel.class.getName()).log(Level.SEVERE, null, ex);
}
}
P.clear();
P.add(0.2);
P.add(0.0);
P.add(0.5);
P.add(0.0);
P.add(0.1);
P.add(0.2);
//rng = new Random();
for (int i = 0 ; i < rept; i++){
try {
int s = rw.select(P, rng);
System.out.println("Element selected "+s+ ", P(s)="+P.get(s));
} catch (Exception ex) {
Logger.getLogger(RouletteWheel.class.getName()).log(Level.SEVERE, null, ex);
}
}
}
/**
* {@inheritDoc}
* @return
*/
@Override
public String toString()
{
return "Roulette Wheel Selection";
}
}
```

Below an execution sample for a proba vector P=[0.2,0.1,0.6,0.1],
WheelElements = [0,1,2,3]:

Element selected 3, P(s)=0.1

Element selected 2, P(s)=0.6

Element selected 3, P(s)=0.1

Element selected 2, P(s)=0.6

Element selected 1, P(s)=0.1

Element selected 2, P(s)=0.6

Element selected 3, P(s)=0.1

Element selected 2, P(s)=0.6

Element selected 2, P(s)=0.6

Element selected 2, P(s)=0.6

Element selected 2, P(s)=0.6

Element selected 2, P(s)=0.6

Element selected 3, P(s)=0.1

Element selected 2, P(s)=0.6

Element selected 2, P(s)=0.6

Element selected 2, P(s)=0.6

Element selected 0, P(s)=0.2

Element selected 2, P(s)=0.6

Element selected 2, P(s)=0.6

Element selected 2, P(s)=0.6

The code also tests a roulette wheel with zero probability.