The point of this question is to create the shortest **not abusively slow** Sudoku solver. This is defined as: **don't recurse when there are spots on the board which can only possibly be one digit**.

Here is the shortest I have so far in python:

```
r=range(81)
s=range(1,10)
def R(A):
bzt={}
for i in r:
if A[i]!=0: continue;
h={}
for j in r:
h[A[j]if(j/9==i/9 or j%9==i%9 or(j/27==i/27)and((j%9/3)==(i%9/3)))else 0]=1
bzt[9-len(h)]=h,i
for l,(h,i)in sorted(bzt.items(),key=lambda x:x[0]):
for j in s:
if j not in h:
A[i]=j
if R(A):return 1
A[i]=0;return 0
print A;return 1
R(map(int, "080007095010020000309581000500000300400000006006000007000762409000050020820400060"))
```

The last line I take to be part of the cmd line input, it can be changed to:

```
import sys; R(map(int, sys.argv[1]);
```

This is similar to other sudoku golf challenges, except that I want to eliminate unnecessary recursion. Any language is acceptable. The challenge is on!