To begin conversion to Chomsky normal form (using Definition (1) provided by the Wikipedia page), you need to find an equivalent essentially noncontracting grammar. A grammar `G`

with start symbol `S`

is essentially noncontracting iff

```
1. S is not a recursive variable
2. G has no ε-rules other than S -> ε if ε ∈ L(G)
```

Calling your grammar `G`

, an equivalent grammar `G'`

with a non-recursive start symbol is:

```
G' : S -> A
A -> aAb | bAa | ε
```

Clearly, the set of nullable variables of `G'`

is `{S,A}`

, since `A -> ε`

is a production in `G'`

and `S -> A`

is a chain rule. I assume that you have been given an algorithm for removing ε-rules from a grammar. That algorithm should produce a grammar similar to:

```
G'' : S -> A | ε
A -> aAb | bAa | ab | ba
```

The grammar `G''`

is essentially noncontracting; you can now apply the remaining algorithms to the grammar to find an equivalent grammar in Chomsky normal form.