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Can someone please help me understand this solution:

 Initialize 2D array with 81 empty grids (nx = 9, ny = 9)
 Fill in some empty grid with the known values
 Make an original copy of the array
 Start from top left grid (nx = 0, ny = 0), check if grid is empty
 if (grid is empty) {
   assign the empty grid with values (i)
   if (no numbers exists in same rows & same columns same as (i) & 3x3 zone (i) is currently in)
     fill in the number
   if (numbers exists in same rows & same columns same as (i) & 3x3 zone (i) is currently in)
     discard (i) and repick other values (i++)
 }
 else {
   while (nx < 9) {
     Proceed to next row grid(nx++, ny)
     if (nx equals 9) {
       reset nx = 1
       proceed to next column grid(nx,ny++)
       if (ny equals 9) {
         print solution
       }
     }
   }
 }
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2  
What part don't you understand? The C code? The algorithm? –  mob Jan 15 '10 at 23:48

4 Answers 4

up vote 14 down vote accepted

It's a simple brute force solver. It starts from the top left, working left to right line by line, trying to place each possible number into each square, and continuing by using a recursive call. On failure it backtracks and tries a different alternative.

The function called safe determines whether it is currently legal to place the value n in a certain cell, by checking which values have already been placed in the row, column and box.

It's one of the simplest (and slowest) ways to solve a Sudoku.

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3  
We could make it slower: Fill the grid randomly, repeat until valid. :-) –  squelart Jan 16 '10 at 0:00
6  
@squelart mmm monkeys and shakespeare :) –  vicatcu Jan 17 '10 at 5:16
    
Then what is the fastest algorithm and from where ca I find it? –  chanchal1987 Jul 19 '10 at 20:59
    
@chanchal1987: fast algorithms keep track of the "safe" values for the positions, and try to fill the position which has the least allowed values (and backtrack if failed). –  Karoly Horvath Dec 5 '11 at 22:42

There are a lot of ways to solve Sudoku (don't know if you're interested in it in general). It is fundamentally a Constraint Satisfaction Problem, and you can apply your favorite consistency checking techniques (e.g. AC3) to propagate constraints and prune obviously fruitless paths much earlier. Your variables are each square, the domain each variable can take is the integers 1 through 9. Constraints are AllDiff on various subsets of the cells.

You can also formulate it as an Integer Linear Programming problem and just let your favorite ILP engine (e.g. lp_solve) solve it!

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The best way to understand the code is to use debugger and see step by step.

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4  
Sometimes the best way to debug, sure. But not usually the best way to understand a new code. –  dmckee Jan 16 '10 at 2:36

The most confusing thing was that I expected the algorithm to fill the sudoku matrix with correct values on finish, but instead it just prints the values and then backtracks to the beginning as the value of t variable is always written back to the grid (maybe algorithm even manages to find another solution).

In order to have the grid filled when the algorithm finishes one could make the solve function return true/false and then decide whether to trace back based on the result of inner calls.

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