Wikipedia says:

In computer science, a context-free grammar is said to be in Chomsky normal form if all of its production rules are of the form:

*A* -> *BC*, or
*A* -> α, or
*S* -> ε

where *A*, *B*, *C* are nonterminal symbols, α is a terminal symbol, *S* is the start symbol, and ε is the empty string. Also, neither *B* nor *C* may be the start symbol.

Continuing your work:

```
S0 -> S
S -> AB | aB | B
A -> aab
B -> bbA | bb
```

Instead of using `|`

to denote different choices, split a rule into multiple rules.

```
S0 -> S
S -> AB
S -> aB
S -> B
A -> aab
B -> bbA
B -> bb
```

Create new rules `Y -> a`

and `Z -> b`

because we will need them soon.

```
S0 -> S
S -> AB
S -> aB
S -> B
A -> aab
B -> bbA
B -> bb
Y -> a
Z -> b
```

`S -> aB`

is not of the form `S -> BC`

because `a`

is a terminal. So change `a`

into `Y`

:

```
S0 -> S
S -> AB
S -> YB
S -> B
A -> aab
B -> bbA
B -> bb
Y -> a
Z -> b
```

Do the same for the `B -> bb`

rule:

```
S0 -> S
S -> AB
S -> YB
S -> B
A -> aab
B -> bbA
B -> ZZ
Y -> a
Z -> b
```

For `A -> aab`

, create `C -> YY`

; for `B -> bbA`

, create `D -> ZZ`

:

```
S0 -> S
S -> AB
S -> YB
S -> B
A -> CZ
C -> YY
B -> DA
D -> ZZ
B -> ZZ
Y -> a
Z -> b
```

For `S -> B`

, duplicate the one rule where `S`

occurs on the right hand side and inline the rule:

```
S0 -> B
S0 -> S
S -> AB
S -> YB
A -> CZ
C -> YY
B -> DA
D -> ZZ
B -> ZZ
Y -> a
Z -> b
```

Deal with the rules `S0 -> B`

and `S0 -> S`

by joining the right hand side to the left hand sides of other rules. Also, delete the orphaned rules (where the LHS symbol never gets used on RHS):

```
S0 -> DA
S0 -> ZZ
S0 -> AB
S0 -> YB
A -> CZ
C -> YY
B -> DA
D -> ZZ
B -> ZZ
Y -> a
Z -> b
```

And we're done. Phew!

`A -> ... | lambda/epsilon`

. – Nayuki Minase Sep 19 '11 at 0:26