To compute the torsion constant, the following quantity must be computed
$$\mathbb{J}_{\omega} = \int_a^b \omega \ \langle \mathbf{p}, \ \mathbf{p}'\rangle \ dt$$
So, the torsion constant vector is given by
$$\mathbb{J}_{\omega j} = \int_a^b \varphi_j \cdot \langle \mathbf{p}, \ \mathbf{p}'\rangle \ dt$$
And it's valid for any type of geometry.
To compute the torsion constant, the following quantity must be computed
So, the torsion constant vector is given by
And it's valid for any type of geometry.