Don't worry, this is the last hint I'll ask for.
I've looked for any position that could exclude others, and what's left is perfectly symmetrical. I've even tried mentally choosing some options to see if I get any contradictions, but nothing obvious jumped at me.
Could you provide me with a hint (and the reasoning behind it) for a next move?
This position requires an advanced technique called forcing chains.
This technique involves looking at cells which have two candidates and tracing out the implications of each alternative. If they both lead to the same result (for example, eliminating the same candidate from some cell), then you can rest assured that that result is correct.
It is helpful when tracing out the implications of each alternative to use different colored pens or pencils. When drawing out the implications, you may also want to reproduce the candidates below themselves in different colors, so that you don't confuse your exploration of possibilities with permanent inferences.
Here is an example of using this technique on your grid:
This technique is based on a general pattern of reasoning which can be represented schematically as:
φ or ψ
φ → χ
ψ → χ
Thus, χ
Two inferences may be made that greatly simplify the sudoku.
Firstly...
If you were to place a 7 in D6 the top-middle nonnet would not be completable, therefore it must be a 2:
X
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 · · | 6 · · | 9 4 7 |
B| 4 · · | 5 · · | 2 6 3 |
C| 6 · · | · 4 · | 8 5 1 |
--------+-------+--------
D| 3 5 · | 1 · 7 | 6 8 4 | X
E| · 1 2 | · 6 4 | 3 9 5 |
F| · 4 6 | · 5 · | 1 7 2 |
--------+-------+--------
G| 2 6 · | 4 1 5 | 7 3 · |
H| 1 3 5 | · · 9 | 4 2 6 |
J| · · 4 | 2 3 6 | 5 1 · |
--------+-------+--------
X Y
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 · · | 6 · · | 9 4 7 |
B| 4 · · | 5 · · | 2 6 3 |
C| 6 · · | · 4 · | 8 5 1 |
--------+-------+--------
D| 3 5 9 | 1 2 7 | 6 8 4 | XY
E| · 1 2 | · 6 4 | 3 9 5 |
F| · 4 6 | · 5 · | 1 7 2 |
--------+-------+--------
G| 2 6 · | 4 1 5 | 7 3 · |
H| 1 3 5 | · · 9 | 4 2 6 |
J| · · 4 | 2 3 6 | 5 1 · |
--------+-------+--------
X
Y
Z
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 · · | 6 8 · | 9 4 7 | X
B| 4 · · | 5 9 · | 2 6 3 | Y
C| 6 · · | · 4 · | 8 5 1 |
--------+-------+--------
D| 3 5 9 | 1 2 7 | 6 8 4 |
E| · 1 2 | · 6 4 | 3 9 5 |
F| · 4 6 | · 5 · | 1 7 2 |
--------+-------+--------
G| 2 6 · | 4 1 5 | 7 3 · |
H| 1 3 5 | · 7 9 | 4 2 6 | Z
J| · · 4 | 2 3 6 | 5 1 · |
--------+-------+--------
X
Y Z
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 · · | 6 8 1 | 9 4 7 | X
B| 4 · · | 5 9 · | 2 6 3 |
C| 6 · · | 3 4 2 | 8 5 1 | YZ
--------+-------+--------
D| 3 5 9 | 1 2 7 | 6 8 4 |
E| · 1 2 | · 6 4 | 3 9 5 |
F| · 4 6 | · 5 · | 1 7 2 |
--------+-------+--------
G| 2 6 · | 4 1 5 | 7 3 · |
H| 1 3 5 | · 7 9 | 4 2 6 |
J| · · 4 | 2 3 6 | 5 1 · |
--------+-------+--------
X
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 · · | 6 8 1 | 9 4 7 |
B| 4 · · | 5 9 | 2 6 3 | X : X is 7 but not 7 -> contradiction.
C| 6 · · | 3 4 2 | 8 5 1 |
--------+-------+--------
D| 3 5 9 | 1 2 7 | 6 8 4 |
E| · 1 2 | · 6 4 | 3 9 5 |
F| · 4 6 | · 5 · | 1 7 2 |
--------+-------+--------
G| 2 6 · | 4 1 5 | 7 3 · |
H| 1 3 5 | · 7 9 | 4 2 6 |
J| · · 4 | 2 3 6 | 5 1 · |
--------+-------+--------
Secondly...
If you were to place a 9 in D3 the top-middle nonnet would not be completable, therefore it must be a 7:
X
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 · · | 6 · · | 9 4 7 |
B| 4 · · | 5 · · | 2 6 3 |
C| 6 · · | · 4 · | 8 5 1 |
--------+-------+--------
D| 3 5 9 | 1 · · | 6 8 4 | X
E| · 1 2 | · 6 4 | 3 9 5 |
F| · 4 6 | · 5 · | 1 7 2 |
--------+-------+--------
G| 2 6 · | 4 1 5 | 7 3 · |
H| 1 3 5 | · · 9 | 4 2 6 |
J| · · 4 | 2 3 6 | 5 1 · |
--------+-------+--------
X Y
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 · · | 6 · · | 9 4 7 |
B| 4 · · | 5 · · | 2 6 3 |
C| 6 · · | · 4 · | 8 5 1 |
--------+-------+--------
D| 3 5 9 | 1 · · | 6 8 4 |
E| · 1 2 | · 6 4 | 3 9 5 |
F| 8 4 6 | · 5 · | 1 7 2 | X
--------+-------+--------
G| 2 6 8 | 4 1 5 | 7 3 · | Y
H| 1 3 5 | · · 9 | 4 2 6 |
J| · · 4 | 2 3 6 | 5 1 · |
--------+-------+--------
X Y Z
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 · · | 6 · · | 9 4 7 |
B| 4 · · | 5 · · | 2 6 3 |
C| 6 · · | · 4 · | 8 5 1 |
--------+-------+--------
D| 3 5 9 | 1 · · | 6 8 4 |
E| 7 1 2 | · 6 4 | 3 9 5 | X
F| 8 4 6 | · 5 3 | 1 7 2 | Y
--------+-------+--------
G| 2 6 8 | 4 1 5 | 7 3 9 | Z
H| 1 3 5 | · · 9 | 4 2 6 |
J| · · 4 | 2 3 6 | 5 1 · |
--------+-------+--------
X
W Y Z
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 · · | 6 · · | 9 4 7 |
B| 4 · · | 5 · · | 2 6 3 |
C| 6 · · | · 4 · | 8 5 1 |
--------+-------+--------
D| 3 5 9 | 1 · · | 6 8 4 |
E| 7 1 2 | 8 6 4 | 3 9 5 | X
F| 8 4 6 | 9 5 3 | 1 7 2 | Y
--------+-------+--------
G| 2 6 8 | 4 1 5 | 7 3 9 |
H| 1 3 5 | · · 9 | 4 2 6 |
J| 9 · 4 | 2 3 6 | 5 1 8 | WZ
--------+-------+--------
X Y
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 · · | 6 · · | 9 4 7 |
B| 4 · · | 5 · · | 2 6 3 |
C| 6 · · | · 4 · | 8 5 1 |
--------+-------+--------
D| 3 5 9 | 1 · · | 6 8 4 |
E| 7 1 2 | 8 6 4 | 3 9 5 |
F| 8 4 6 | 9 5 3 | 1 7 2 |
--------+-------+--------
G| 2 6 8 | 4 1 5 | 7 3 9 |
H| 1 3 5 | 7 · 9 | 4 2 6 | Y
J| 9 7 4 | 2 3 6 | 5 1 8 | X
--------+-------+--------
X Y
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 · · | 6 · · | 9 4 7 |
B| 4 · · | 5 · · | 2 6 3 |
C| 6 · · | 3 4 · | 8 5 1 | X
--------+-------+--------
D| 3 5 9 | 1 · · | 6 8 4 |
E| 7 1 2 | 8 6 4 | 3 9 5 |
F| 8 4 6 | 9 5 3 | 1 7 2 |
--------+-------+--------
G| 2 6 8 | 4 1 5 | 7 3 9 |
H| 1 3 5 | 7 8 9 | 4 2 6 | Y
J| 9 7 4 | 2 3 6 | 5 1 8 |
--------+-------+--------
X Y
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 · · | 6 2 · | 9 4 7 | Y
B| 4 · · | 5 · · | 2 6 3 |
C| 6 · 7 | 3 4 · | 8 5 1 | X
--------+-------+--------
D| 3 5 9 | 1 · · | 6 8 4 |
E| 7 1 2 | 8 6 4 | 3 9 5 |
F| 8 4 6 | 9 5 3 | 1 7 2 |
--------+-------+--------
G| 2 6 8 | 4 1 5 | 7 3 9 |
H| 1 3 5 | 7 8 9 | 4 2 6 |
J| 9 7 4 | 2 3 6 | 5 1 8 |
--------+-------+--------
X
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 · · | 6 2 · | 9 4 7 |
B| 4 · · | 5 · · | 2 6 3 |
C| 6 · 7 | 3 4 | 8 5 1 | X : X cannot be any value -> contradiction
--------+-------+--------
D| 3 5 9 | 1 · · | 6 8 4 |
E| 7 1 2 | 8 6 4 | 3 9 5 |
F| 8 4 6 | 9 5 3 | 1 7 2 |
--------+-------+--------
G| 2 6 8 | 4 1 5 | 7 3 9 |
H| 1 3 5 | 7 8 9 | 4 2 6 |
J| 9 7 4 | 2 3 6 | 5 1 8 |
--------+-------+--------
Setting these two values to what they logically must be, the rest of the sudoku is solvable entirely by "naked singles":
X Y
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 · · | 6 · · | 9 4 7 |
B| 4 · · | 5 · · | 2 6 3 |
C| 6 · · | · 4 · | 8 5 1 |
--------+-------+--------
D| 3 5 7 | 1 9 2 | 6 8 4 | Y
E| 8 1 2 | · 6 4 | 3 9 5 | X
F| · 4 6 | · 5 · | 1 7 2 |
--------+-------+--------
G| 2 6 · | 4 1 5 | 7 3 · |
H| 1 3 5 | · · 9 | 4 2 6 |
J| · · 4 | 2 3 6 | 5 1 · |
--------+-------+--------
X Y
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 · · | 6 · · | 9 4 7 |
B| 4 · · | 5 · · | 2 6 3 |
C| 6 · · | · 4 · | 8 5 1 |
--------+-------+--------
D| 3 5 7 | 1 9 2 | 6 8 4 |
E| 8 1 2 | 7 6 4 | 3 9 5 | Y
F| 9 4 6 | · 5 · | 1 7 2 | X
--------+-------+--------
G| 2 6 · | 4 1 5 | 7 3 · |
H| 1 3 5 | · · 9 | 4 2 6 |
J| · · 4 | 2 3 6 | 5 1 · |
--------+-------+--------
X Y
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 · · | 6 · · | 9 4 7 |
B| 4 · · | 5 · · | 2 6 3 |
C| 6 · · | · 4 · | 8 5 1 |
--------+-------+--------
D| 3 5 7 | 1 9 2 | 6 8 4 |
E| 8 1 2 | 7 6 4 | 3 9 5 |
F| 9 4 6 | · 5 · | 1 7 2 |
--------+-------+--------
G| 2 6 · | 4 1 5 | 7 3 · |
H| 1 3 5 | 8 · 9 | 4 2 6 | Y
J| 7 · 4 | 2 3 6 | 5 1 · | X
--------+-------+--------
X Y
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 · · | 6 · · | 9 4 7 |
B| 4 · · | 5 · · | 2 6 3 |
C| 6 · · | · 4 · | 8 5 1 |
--------+-------+--------
D| 3 5 7 | 1 9 2 | 6 8 4 |
E| 8 1 2 | 7 6 4 | 3 9 5 |
F| 9 4 6 | 3 5 · | 1 7 2 | X
--------+-------+--------
G| 2 6 · | 4 1 5 | 7 3 · |
H| 1 3 5 | 8 7 9 | 4 2 6 | Y
J| 7 · 4 | 2 3 6 | 5 1 · |
--------+-------+--------
X Y Z
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 · · | 6 · · | 9 4 7 |
B| 4 · · | 5 8 · | 2 6 3 | Y
C| 6 · · | 9 4 · | 8 5 1 | X
--------+-------+--------
D| 3 5 7 | 1 9 2 | 6 8 4 |
E| 8 1 2 | 7 6 4 | 3 9 5 |
F| 9 4 6 | 3 5 8 | 1 7 2 | Z
--------+-------+--------
G| 2 6 · | 4 1 5 | 7 3 · |
H| 1 3 5 | 8 7 9 | 4 2 6 |
J| 7 · 4 | 2 3 6 | 5 1 · |
--------+-------+--------
X Y
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 · · | 6 2 · | 9 4 7 | Y
B| 4 · · | 5 8 · | 2 6 3 |
C| 6 · 3 | 9 4 · | 8 5 1 | X
--------+-------+--------
D| 3 5 7 | 1 9 2 | 6 8 4 |
E| 8 1 2 | 7 6 4 | 3 9 5 |
F| 9 4 6 | 3 5 8 | 1 7 2 |
--------+-------+--------
G| 2 6 · | 4 1 5 | 7 3 · |
H| 1 3 5 | 8 7 9 | 4 2 6 |
J| 7 · 4 | 2 3 6 | 5 1 · |
--------+-------+--------
X Y
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 8 · | 6 2 · | 9 4 7 | X
B| 4 · · | 5 8 · | 2 6 3 |
C| 6 · 3 | 9 4 7 | 8 5 1 | Y
--------+-------+--------
D| 3 5 7 | 1 9 2 | 6 8 4 |
E| 8 1 2 | 7 6 4 | 3 9 5 |
F| 9 4 6 | 3 5 8 | 1 7 2 |
--------+-------+--------
G| 2 6 · | 4 1 5 | 7 3 · |
H| 1 3 5 | 8 7 9 | 4 2 6 |
J| 7 · 4 | 2 3 6 | 5 1 · |
--------+-------+--------
W
X Y Z
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 8 1 | 6 2 · | 9 4 7 | Y
B| 4 · · | 5 8 1 | 2 6 3 | Z
C| 6 2 3 | 9 4 7 | 8 5 1 | W
--------+-------+--------
D| 3 5 7 | 1 9 2 | 6 8 4 |
E| 8 1 2 | 7 6 4 | 3 9 5 |
F| 9 4 6 | 3 5 8 | 1 7 2 |
--------+-------+--------
G| 2 6 · | 4 1 5 | 7 3 · |
H| 1 3 5 | 8 7 9 | 4 2 6 |
J| 7 9 4 | 2 3 6 | 5 1 · | X
--------+-------+--------
W
V X Y Z
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 8 1 | 6 2 3 | 9 4 7 | Y
B| 4 7 9 | 5 8 1 | 2 6 3 | VW
C| 6 2 3 | 9 4 7 | 8 5 1 |
--------+-------+--------
D| 3 5 7 | 1 9 2 | 6 8 4 |
E| 8 1 2 | 7 6 4 | 3 9 5 |
F| 9 4 6 | 3 5 8 | 1 7 2 |
--------+-------+--------
G| 2 6 8 | 4 1 5 | 7 3 · | X
H| 1 3 5 | 8 7 9 | 4 2 6 |
J| 7 9 4 | 2 3 6 | 5 1 8 | Z
--------+-------+--------
X
1 2 3 4 5 6 7 8 9
--------+-------+--------
A| 5 8 1 | 6 2 3 | 9 4 7 |
B| 4 7 9 | 5 8 1 | 2 6 3 |
C| 6 2 3 | 9 4 7 | 8 5 1 |
--------+-------+--------
D| 3 5 7 | 1 9 2 | 6 8 4 |
E| 8 1 2 | 7 6 4 | 3 9 5 |
F| 9 4 6 | 3 5 8 | 1 7 2 |
--------+-------+--------
G| 2 6 8 | 4 1 5 | 7 3 9 | X : complete
H| 1 3 5 | 8 7 9 | 4 2 6 |
J| 7 9 4 | 2 3 6 | 5 1 8 |
--------+-------+--------
Note:
You could perform either one of the inferences, simplify the board and then spot the other more easily.
