Is there a way to simplify this conjugate expresion:

```
expr=d12*Conjugate[C1]*C2 + d12*Conjugate[C2]*C1 + d13*Conjugate[C1]*C3 + d13*Conjugate[C3]*C1
```

into something like:

```
2 d12 (Re[C1*Conjugate[C2]]) + 2 d13 (Re[C1*Conjugate[C3]])
```

And in general, how Mathematica determines one expression is simpler than another? Is there a way to add some personalized rules to its simplification process? For example, can we tell Mathematica that we prefer `2*Re[C1*Conjugate[C2]]`

than `C1*Conjugate[C2]+C2*Conjugate[C1]`

? Thanks.

*Update*:

Thanks for the suggestions. `ComplexExpand`

can expand it to real and imaginary part, but seems still can't simplify to the preferred form:

```
In: Simplify[ComplexExpand[expr, {C1, C2, C3}]]
Out: 2 (Im[C1] (d12 Im[C2] + d13 Im[C3]) + Re[C1] (d12 Re[C2] + d13 Re[C3]))
```

I tried the TransformationFunctions function like this but it doesn't work:

```
In: t = # /. (Im[C1] Im[C2] + Re[C1] Re[C2] -> 1/2 Re[C1\[Conjugate] C2]) &;
In: Simplify[ComplexExpand[expr, {C1, C2, C3}], TransformationFunctions -> {Automatic, t}]
Out: 2 (Im[C1] (d12 Im[C2] + d13 Im[C3]) + Re[C1] (d12 Re[C2] + d13 Re[C3]))
```

Am I doing the wrong way? Thanks.

`ComplexExpand[]`

? – belisarius Nov 12 '12 at 3:05