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I want to find all the integer subsets that sum n via backtracking

For example for the integers:

1 2 3 4 5 6 7

and n = 7

I want to ouput

1 2 4
1 6
2 5
3 4

I think that I should pass the position in the integer array that I'm evaluating as argument, but I'm stuck writing the rest of the logic.

My code so far:

import java.io.BufferedReader;
import java.io.IOException;
import java.io.InputStreamReader;
import java.util.ArrayList;
import java.util.Collections;
import java.util.HashSet;
import java.util.Set;
import java.util.TreeSet;

 * @author talleres
public class Main {

int sum (TreeSet<Integer>ts, int temp) {

    int sum=0;

    for (Integer i: ts){

        sum +=i;


    return sum+temp;

static HashSet<TreeSet<Integer>> alternatives = new HashSet <TreeSet<Integer>>();
static ArrayList<TreeSet<Integer>> subsets = new ArrayList <TreeSet<Integer>>();

static TreeSet<Integer> getNextSubset (){

    TreeSet<Integer> alternative = new TreeSet<Integer>();

    if (!alternatives.contains(alternative)){   
        return alternative;   
    else return null; // BEWARE!! 

static void findSubsets (ArrayList<Integer> numbers, int amount, int index){

    TreeSet <Integer> subset = new TreeSet<Integer>();

    int temp = numbers.get(index); //initialize alternative

    if (temp<=amount)

    if (temp==amount)


    public static void main(String[] args) throws IOException {
        // TODO code application logic here

        BufferedReader br = new BufferedReader(new InputStreamReader(System.in));
        System.out.println("inset integers");

        ArrayList<Integer> numeros = new ArrayList<Integer>();
        String line=br.readLine();

        while (!line.equals("")){
            numeros.add (Integer.parseInt(line));
            line = br.readLine();


        System.out.println("insert the amount the subsets should sum");
           line = br.readLine();

        int amount = Integer.parseInt(line);

        ArrayList<Integer> accum = new ArrayList<Integer>();

        findSubsets(numeros, amount, 0);


share|improve this question
What can we help you on? –  Marcelo May 26 '11 at 13:23

2 Answers 2

Here's some pseudo code for you to work with:

Set<Set<Integer>> subsets(Set<Integer> remaining, int n) {
    results = new HashSet<Set<Integer>>();

    if (n == 0)
        results.add(empty set);

    for each i in remaining
        newRemaining = remaining \ {i}

        for each subresult in subsets(newRemaining, n - i)
            results.add(subresult + {i})

    return results

Should work for negative numbers as well. (uhm, actually will work. I implemented it and tested it before writing the pseudo code :-)

share|improve this answer
I implemented as: –  andandandand May 26 '11 at 14:02
Set<Set<Integer>> subsets(Set<Integer> remaining, int n) { HashSet<Set<Integer>> results = new HashSet<Set<Integer>>(); if (n == 0) results.add(new TreeSet<Integer>()); for (Integer i:remaining){ Set<Integer> newRemaining = new TreeSet<Integer>(); newRemaining.remove(i); for (Set<Integer> subresult: subsets){ results.add(subresult.add(i)); } } –  andandandand May 26 '11 at 14:02
and getting a "cannot find symbol" error on line results.add(subresult.add(i)); –  andandandand May 26 '11 at 14:04
subresult.add(i) returns a boolean. split it up into two lines. –  aioobe May 26 '11 at 14:11
how did you implement this line? for each subresult in subsets(newRemaining, n - i) results.add(subresult + {i}) –  andandandand May 26 '11 at 14:37

I might be tempted to do this in a recursive function. It feels straightforward. It might not be the best, but it will work well.

This is very much in pseudo-code and assumes the numbers are 1..END. If you are given a list, sorting and then using list[i] would be appropriate.

find(int curpos,int cursum,int sumleft,char output[])
  if (sumleft == 0)
  if (curpos > sumleft)
  for(i=curpos;i<=TARGET && i<=sumleft)

  char output[100];
share|improve this answer
Doesn't really answer the question, since the question asked for backtracking... but +1 because it's exactly what I thought of when I read the question, and it never hurts to point out other solutions to a problem. –  RHSeeger May 26 '11 at 14:07

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