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Here is an interview question: Input: Integer N; different positive integers a1, a2 ... aN;

Output: the minimum positive integer m, which cannot be represented in the form m = x1*a1+x2*a2+...xN*aN, where xi={0,1}.

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I wonder if there is any better approach than enumerating all 2^n possibilities. Seems related to the knapsack problem, although I do not see an actual reduction. –  Nemo Oct 18 '11 at 5:04
It's also related to polynomial universal codes. –  ruslik Oct 18 '11 at 10:01

3 Answers 3

naive solution:

public static void calcAllSums(int[] arr, int sum, int curIndex, Hashtable<Integer,Boolean> sums){
    if (curIndex == arr.length) return;
    int sum1 = sum+arr[curIndex];
    int sum2 = sum;
    sums.put(sum1, true);
    sums.put(sum2, true);
    calcAllSums(arr, sum1, curIndex+1, sums);
    calcAllSums(arr, sum2, curIndex+1, sums);
public static void main(String[] args){
    int[] arr = {1,3,5};
    Hashtable<Integer,Boolean> sums = new Hashtable<Integer,Boolean>();
    calcAllSums(arr, 0, 0, sums);
    int i=0;
    while (sums.containsKey(i)) i++;

i calculated all possible sums, and iterated until i found an integer which is not in the list

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given problem is a variant of subset sum problem which is NP hard problem and best solution is O(2^n/2). en.wikipedia.org/wiki/Subset_sum_problem , above algo takes O(2^n) which is indeed optimized in summing. –  vikas368 Oct 18 '11 at 6:32

For extremely fast all-sums-of-3-numbers code, see explanation at polygenelubricants.com of code by Aliaksei Safryhin. The series of statements like

*pTo++ += short(*pFrom++) << 8; *pTo++ += short(*pFrom++) << 8; 

may look clumsy and slow, but in my tests ran many times faster than shifted-bit-map methods. Also see Al Zimmermann's Son of Darts and How can I improve this algorithm for solving a modified Postage Stamp problem? and if you can find darts.pdf by John Morris, 7 July 2010, it contains code of a fairly fast enumerator for first-missing-subset-sums for 3 to 20 numbers.

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Excellent resources, would upvote again. :) –  Coffee on Mars Oct 18 '11 at 8:37

Since the minimal difference between two successive numbers is the least of the an factors, and 0 is representable, I'd say

minn(an) - 1

Of course, if minn(an) = 1, you could make a similar reasoning for the second-to-minimum.

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