Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

How can I incorporate this boolean T/F check into this code without it going through the entire arraylist>?

the situation is as follows;

arraylist<arraylist<Integer>> bigArray....elig arraylist<Boolean>
elig.size() == bigArray.get(0).size();
bigArray is rectangular (i.e. no differing sizes of interior Lists

my code is as follows:

for(int j=0; j<(bigArr.size()); j++) {  //lets assume this is ==10           
  for(int e=0; e<(ballotArr.get(0).size()); e++) {   //assume == 5
    if(elig.get(e) == false) {          
        for(int k=0; k<(ballotArr.get(0).size()); k++) {  //==5
            bigArr.get(j).set(k, big.get(j).get(k)-1);
        }
    }
  } 
}

As can be clearly seen, this will loop thru the most interior for loop 10 times anytime elig.get(e)==false, and subtract from all of the indices.

what is necessary is for elig.get(e) to hold a steady value while the for(int k) processes, and then afterwards get the next value (at least I believe this is the solution)

the goal is to subtract 1 from all the rows who have a value of 1 in a specific column.

Thanks for any help/suggestions.

share|improve this question

1 Answer 1

Using the library implementations, this can be sped up slightly. The use of customized collections may make this faster yet, but that's out-of-scope here. You are up against certain iteration constraints, so there's only so much you can do in any case.

It will be helpful to break up the procedure into smaller methods:

public static void decrementColumns(List<List<Integer>> rows, List<Boolean> mask) {
    final List<Integer> maskIndicies = getMaskIndicies(mask);
    // We're locked into this iteration because we have to modify every row.
    for (List<Integer> row : rows) {
        apply(maskIndicies, row);
    }
}

// Your big savings will come from figuring out the indicies.
// This allows us to make the iterations-per-row smaller - 
//   assuming not every row (or even most) is set to 'true'!
public static List<Integer> getMaskIndicies(List<Boolean> mask) {
    final List<Integer> maskIndicies = new ArrayList<Integer>(mask.size());
    for (int i = 0; i < mask.size(); i++) {
        if (mask.get(i)) {
            maskIndicies.add(i);
        }
    } 
}

public static void apply(List<Integer> maskIndicies, List<Integer> row) {
    // We're locked into this iteration, needing to apply the transformation
    // to every column included.
    for (Integer index : maskIndicies) {
        final Integer modified = row.get(index) - 1;
        row.set(index, modified);
    }
}

Please note that this is NOT threadsafe, so be careful. I also didn't write in any safety checks, so...


EDIT:

Upon re-reading the question, I've realized I initially mis-read what the code was doing (and I'm kicking myself - somehow I dropped a loop).

The revised version:

public static void decrementColumns(List<List<Integer>> rows, List<Boolean> mask) {
    final int count = getMaskCount(mask);
    // We're locked into this iteration because we have to modify every row.
    for (List<Integer> row : rows) {
        apply(row, count);
    }
}

public static void int getMaskCount(List<Boolean> mask) {
    int count = 0;
    for(Boolean flag : mask) {
        if (!flag) {
            count++;
        }
    }
    return count;
}

public static void apply(List<Integer> row, int count) {
    for (int index = 0; index < row.size(); index++) {
        final Integer modified = row.get(index) - count;
        row.set(index, modified);
    }
}

Please note that this still isn't doing ~exactly~ what your original code does, only what I'm assuming you're attempting to do, given your 'requirements' text. For one thing, you define at least 2 additional list, that you don't give the relationships for - one of which I'm fairly sure is a typo. If you edit your question for clarity, I may be able to provide a better answer; there's a few ambiguous or contradictory things going on between your code and your question text. Please note that while your original code runs in O(m * (n ^ 2)), the minimum (and my version) runs in O(n + (m * n)).

share|improve this answer
    
Any suggestions on doing this my way (i.e. not sped up slightly)? I really want to get the logic down on this. –  Dax Duisado Feb 2 '12 at 2:20

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.