The transformation you're looking for is not linear, so it can't be represented by a matrix.

To tell that it's not linear, imagine the torus centered at the origin laid out parallel to the xy-plane. The positive x-axis intersects the torus at two points; let's call the one closer to the origin `a`

and the farther one `b`

.

After you apply your transformation, we expect that `a`

and `b`

both moved away from the origin by the same amount. But since `b`

is a multiple of `a`

, this is impossible:

```
b = c*a
f(b) - b = f(c*a) - c*a
= c*f(a) - c*a
= c*( f(a) - a )
```

The same multiple that relates `a`

and `b`

also relates how far `a`

moved compared to `b`

.

You will have the same problem even if you project the torus onto a plane.