# Add +/- to make a numeric string evaluated in 0

Given a string consisting of number, add + or - sign to make the expression values 0. Return the expression.

For example,

123 => 1 + 2 -3 = 0

173956 => 17 + 39 - 56 = 0

I have no clues to solve this problem other than a brute-force way.

Is there any suggestion?

-
Maybe math.stackexchange.com would be a better place to ask this. – Uooo Oct 18 '12 at 6:15
Did you look at Dynamic Programming for solving it? – stackoverflowery Oct 18 '12 at 6:15
I tried dynamic programming, but it is a little bit difficult to get an optimal substructure. – StarPinkER Oct 18 '12 at 6:19
You can reduce the possibilities some by using even/odd testing (first dividing all the digits by their gcd). There must be an even number of odd final digits. – Jim Balter Oct 18 '12 at 11:02

This is a search problem. Search must be performed in the solution space. Suppose we starting from '123' string, at this point, we can add + or - sign after '1', as result we get '1 + 23' or '1 - 23'. Every variant can be split further by adding a sign after next character. As result, all possible sign additions will form tree-like structure - the solution space. Your algorithm must search solution in this structure. I think A* can be used to do this.

Anders K draw nice ASCII graph of the solution space, you just need to search it for solution. Simple breadth first search or depth first search can do the work, but I think it will be slow if solution space is large.

Also, I think that is possible to find more optimal, specific solution that exploits properties of the solution space, for example - it's tree-like structure.

-
Thank you, but I think Anders K has missed one branch, (+|-|concat), right? – StarPinkER Oct 18 '12 at 6:47
Yes, if this is the case, solution space will be a graph. – Lazin Oct 18 '12 at 7:09

you can solve it in many ways for example using a recursive approach which becomes obvious if you structure it up as a tree

e.g. 123

since there can be two different signs after a digit digit `(+|-)` :

``````        1
/ \
+   -
/     \
2       2
/ \     / \
+   -   +   -
|   |   |   |
3   3   3   3
``````
-