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I'm working on a sudoko solver (python). my method is using a game tree and explore possible permutations for each set of digits by DFS Algorithm.

in order to analyzing problem, i want to know what is the count of possible valid and invalid sudoko tables?

-> a 9*9 table that have 9 one, 9 two, ... , 9 nine.

(this isn't exact duplicate by this question)

my solution is:

1- First select 9 cells for 1s: (*)
alt text
2- and like (1) for other digits (each time, 9 cells will be deleted from remaining available cells): C(81-9,9) , C(81-9*2,9) .... =
alt text
3- finally multiply the result by 9! (permutation of 1s-2s-3s...-9s in (*))
alt text
this is not equal to accepted answer of this question but problems are equivalent. what did i do wrong?

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Try MathOverflow, this isn't a programming issue at this stage. –  Lazarus Apr 3 '10 at 9:44
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@ Lazarus: i think it's related to, because it's appeared when try to solve a programming problem. –  sorush-r Apr 3 '10 at 9:50
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@Lazarus: per its FAQ, MathOverflow is for "research level math questions". –  AakashM Apr 3 '10 at 9:58
    
@Sorush, then it should be expressed as a programming problem rather than a math problem. You haven't shown a single line of code but lots of forumlae. Describing an analytical process and asking for help on it wouldn't make it a programming problem just because you are writing a program to solve that problem, the issue is with the theory not the practice. It's a very simple distinction. –  Lazarus Apr 3 '10 at 17:21
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@Lazarus: I didn't say it was a good fit for SO. I made no comment on that issue, in fact. My intent was to point out that suggesting MO for this question would be inappropriate. –  AakashM Apr 3 '10 at 19:14
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3 Answers 3

up vote 2 down vote accepted

The number of valid Sudoku solution grids for the standard 9×9 grid was calculated by Bertram Felgenhauer and Frazer Jarvis in 2005 to be 6,670,903,752,021,072,936,960.

Mathematics of Sudoku | source

I think problem with your solution is that deleting 9 cells each time from available cells does not necessarily create a valid grid. What I mean is just deleting 9 cells won't suffice.

That is why 81! / (9!)^9 is much bigger number than actual valid solutions.

EDIT:

Permutations with repeated elements

Your solutions is almost correct if you want all the tables not just valid sudoku tables.

There is a formula:

(a+b+c+...)! / [a! b! c! ....]

Suppose there are 5 boys and 3 girls and we have 8 seats then number of different ways in which they can seat is

(5+3)! / (5! 3!)

Your problem is analogous to this one.

There are 9 1s , 9 2s ... 9 9s. and 81 places

so answer should be (9+9+...)! / (9!)^9

Now if you multiply again by 9! then this will add duplicate arrangements to the number by shuffling them.

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@TheMachineCharmer: i don't want number of valid tables. do you think count of valid n*n sudoko tables filled by digits of n+1 radix is NP Hard? the solution you referred, solves problem by counting. (like 4-color) :-) –  sorush-r Apr 3 '10 at 10:07
    
Your solution seems correct if you want all the tables not just valid ones :) –  Pratik Deoghare Apr 3 '10 at 10:11
    
@ TheMachineCharmer : Hm... so is stackoverflow.com/questions/2512598/… an incorrect answer? –  sorush-r Apr 3 '10 at 10:15
    
No your answer should be 81!/(9!)^9 actually. I ll explain in a moment ;) –  Pratik Deoghare Apr 3 '10 at 10:18
    
I can't see why are you multiplying by 9! ? could you explain please? It is not necessary. –  Pratik Deoghare Apr 3 '10 at 10:28
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According to this Wikipedia article (or this OEIS sequence), there are roughly 6.6 * 10^21 different sudoku squares.

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What you did wrong was the last step: you shouldn't multiply the answer by 9!. You have already counted all possible squares.

This doesn't help you much when counting the possible Sudoku-tables. One other thing you could do is to count the tables where the "row-condition" holds: that is just (9!)^9, because you just choose one permutation of 1..9 for every row.

Still closer to the Sudoku-problem is counting Latin squares. Latin square has to satisfy both the "row-condition" and "column condition". That is already a difficult problem and no closed form formula is known. Sudoku is a Latin square with the additional "subsquare-condition".

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