I'm having trouble going to different coordinates for the hyperbolic geometry metric:
$$dl^2=d\chi^2\, - \, \frac{1}{\kappa}\sinh^2(\sqrt{-\,\kappa}\,\,\chi)\,\big(\,d\theta^2 \, +\, \sin(\theta)^2 \,d\phi^2 \, \big), \,\,\,\,\,\, \kappa <0$$
How does one go to the hyperbolic embedding space with:
$$dL^2=(dX^1)^2+(dX^2)^2+(dX^3)^2-(dX^4)^2$$